Special relativity (SR) (also known as the special theory of relativity or STR) is the physical theory of measurement in inertial frames of reference proposed in 1905 by Albert Einstein (after the considerable and independent contributions of Hendrik Lorentz, Henri Poincaré and others) in the paper "On the Electrodynamics of Moving Bodies".^{[1]} It generalizes Galileo's principle of relativity–that all uniform motion is relative, and that there is no absolute and welldefined state of rest (no privileged reference frames)–from mechanics to all the laws of physics, including both the laws of mechanics and of electrodynamics, whatever they may be.^{[2]} Special relativity incorporates the principle that the speed of light is the same for all inertial observers regardless of the state of motion of the source.^{[3]}
This theory has a wide range of consequences which have been experimentally verified,^{[4]} including counterintuitive ones such as length contraction, time dilation and relativity of simultaneity, contradicting the classical notion that the duration of the time interval between two events is equal for all observers. (On the other hand, it introduces the spacetime interval, which is invariant.) Combined with other laws of physics, the two postulates of special relativity predict the equivalence of matter and energy, as expressed in the massenergy equivalence formula E = mc^{2}, where c is the speed of light in a vacuum.^{[5]}^{[6]} The predictions of special relativity agree well with Newtonian mechanics in their common realm of applicability, specifically in experiments in which all velocities are small compared to the speed of light.
The theory is termed "special" because it applies the principle of relativity only to frames in uniform relative motion.^{[7]} Einstein developed general relativity to apply the principle more generally, that is, to any frame so as to handle general coordinate transformations, and that theory includes the effects of gravity. From the theory of general relativity it follows that special relativity will still apply locally (i.e. to the first order) to observers moving on arbitrary trajectories^{[8]}, and hence to any relativistic situation where gravity is not a significant factor.
Special relativity reveals that c is not just the velocity of a certain phenomenon, namely the propagation of electromagnetic radiation (light)—but rather a fundamental feature of the way space and time are unified as spacetime. A consequence of this is that it is impossible for any particle that has mass to be accelerated to the speed of light.
In his autobiographical notes published in November 1949 Einstein described how he had arrived at the two fundamental postulates on which he based the special theory of relativity. After describing in detail the state of both mechanics and electrodynamics at the beginning of the 20th century, he wrote:^{[9]}
"Reflections of this type made it clear to me as long ago as shortly after 1900, i.e., shortly after Planck's trailblazing work, that neither mechanics nor electrodynamics could (except in limiting cases) claim exact validity. Gradually I despaired of the possibility of discovering the true laws by means of constructive efforts based on known facts. The longer and the more desperately I tried, the more I came to the conviction that only the discovery of a universal formal principle could lead us to assured results... How, then, could such a universal principle be found?"^{[9]}
He discerned two fundamental propositions that seemed to be the most assured, regardless of the exact validity of either the (then) known laws of mechanics or electrodynamics. These propositions were:(1) the constancy of the velocity of light, and (2) the independence of physical laws (especially the constancy of the velocity of light) from the choice of inertial system. In his initial presentation of special relativity in 1905 he expressed these postulates as:^{[1]}
It should be noted that the derivation of special relativity depends not only on these two explicit postulates, but also on several tacit assumptions (which are made in almost all theories of physics), including the isotropy and homogeneity of space and the independence of measuring rods and clocks from their past history.^{[10]}
Following Einstein's original presentation of special relativity in 1905, many different sets of postulates have been proposed in various alternative derivations.^{[11]} However, the most common set of postulates remains those employed by Einstein in his original paper. A more mathematical statement of the Principle of Relativity made later by Einstein, which introduces the concept of simplicity not mentioned above is:^{[12]}
Special principle of relativity: If a system of coordinates K is chosen so that, in relation to it, physical laws hold good in their simplest form, the same laws hold good in relation to any other system of coordinates K' moving in uniform translation relatively to K.– Albert Einstein: The foundation of the general theory of relativity, Section A, §1
The two postulates of special relativity imply the applicability to physical laws of the Poincaré group of symmetry transformations, of which the Lorentz transformations are a subset, thereby providing a mathematical framework for special relativity. Many of Einstein's papers present derivations of the Lorentz transformation based upon these two principles.^{[13]}
Einstein consistently based the derivation of Lorentz invariance (the essential core of special relativity) on just the two basic principles of relativity and lightspeed invariance. He wrote:^{[9]}"The insight fundamental for the special theory of relativity is this: The assumptions relativity and light speed invariance are compatible if relations of a new type ("Lorentz transformation") are postulated for the conversion of coordinates and times of events... The universal principle of the special theory of relativity is contained in the postulate: The laws of physics are invariant with respect to Lorentz transformations (for the transition from one inertial system to any other arbitrarily chosen inertial system). This is a restricting principle for natural laws..."^{[9]}
Thus many modern treatments of special relativity base it on the single postulate of universal Lorentz covariance, or, equivalently, on the single postulate of Minkowski spacetime.^{[14]}^{[15]}
From the principle of relativity alone without assuming the constancy of the speed of light, i.e. using the isotropy of space and the symmetry implied by the principle of special relativity, one can show that the spacetime transformations between inertial frames are either Euclidean, Galilean, or Lorentzian. In the Lorentzian case, one can then obtain relativistic interval conservation and a certain finite limiting speed. Experiments suggest that this speed is the speed of light in vacuum. ^{[16]}^{[17]}
In addition to the papers referenced above—which give derivations of the Lorentz transformation and describe the foundations of special relativity—Einstein also wrote at least four papers giving heuristic arguments for the equivalence (and transmutability) of mass and energy, for E = mc^{2}.
Massenergy equivalence is a consequence of special relativity. The energy and momentum, which are separate in Newtonian mechanics, form a fourvector in relativity, and this relates the time component (the energy) to the space components (the momentum) in a nontrivial way. For an object at rest, the energymomentum fourvector is (E, 0, 0, 0): it has a time component which is the energy, and three space components which are zero. By changing frames with a Lorentz transformation in the x direction with a small value of the velocity v, the energy momentum fourvector becomes (E, Ev/c^{2}, 0, 0). The momentum is equal to the energy divided by c^{2} times the velocity. So the newtonian mass of an object, which is the ratio of the momentum to the velocity for slow velocities, is equal to E/c^{2}.
The energy and momentum are properties of matter, and it is impossible to deduce that they form a fourvector just from the two basic postulates of special relativity by themselves, because these don't talk about matter, they only talk about space and time. The derivation therefore requires some additional physical reasoning. In his 1905 paper, Einstein used the additional principles that Newtonian mechanics should hold for slow velocities, so that there is one energy scalar and one threevector momentum at slow velocities, and that the conservation law for energy and momentum is exactly true in relativity. Furthermore, he assumed that the energy/momentum of light transforms like the energy/momentum a massless particles, which was known to be true from Maxwell's equations.^{[18]} The first of Einstein's papers on this subject was Does the Inertia of a Body Depend upon its Energy Content? in 1905.^{[19]} Although Einstein's argument in this paper is nearly universally accepted by physicists as correct, even selfevident, many authors over the years have suggested that it is wrong.^{[20]} Other authors suggest that the argument was merely inconclusive because it relied on some implicit assumptions.^{[21]}
Einstein acknowledged the controversy over his derivation in his 1907 survey paper on special relativity. There he notes that it is problematic to rely on Maxwell's equations for the heuristic massenergy argument. The argument in his 1905 paper can be carried out with the emission of any massless particles, but the Maxwell equations are implicitly used to make it obvious that the emission of light in particular can be achieved only by doing work. To emit electromagnetic waves, all you have to do is shake a charged particle, and this is clearly doing work, so that the emission is of energy.^{[22]}^{[23]}
The principle of relativity, which states that there is no preferred inertial reference frame, dates back to Galileo, and was incorporated into Newtonian Physics. However, in the late 19^{th} century, the existence of electromagnetic waves led physicists to suggest that the universe was filled with a substance known as "aether", which would act as the medium through which these waves, or vibrations traveled. The aether was thought to constitute an absolute reference frame against which speeds could be measured. In other words, the aether was the only fixed or motionless thing in the universe. Aether supposedly had some wonderful properties: it was sufficiently elastic that it could support electromagnetic waves, and those waves could interact with matter, yet it offered no resistance to bodies passing through it. The results of various experiments, including the MichelsonMorley experiment, indicated that the Earth was always 'stationary' relative to the aether–something that was difficult to explain, since the Earth is in orbit around the Sun. Einstein's elegant solution was to discard the notion of an aether and an absolute state of rest. Special relativity is formulated so as to not assume that any particular frame of reference is special; rather, in relativity, any reference frame moving with uniform motion will observe the same laws of physics. In particular, the speed of light in a vacuum is always measured to be c, even when measured by multiple systems that are moving at different (but constant) velocities.
Einstein has said that all of the consequences of special relativity can be derived from examination of the Lorentz transformations.^{[citation needed]}
These transformations, and hence special relativity, lead to different physical predictions than Newtonian mechanics when relative velocities become comparable to the speed of light. The speed of light is so much larger than anything humans encounter that some of the effects predicted by relativity are initially counterintuitive:
of a rapidly accelerating observer.
In this animation, the vertical direction indicates time and the horizontal direction indicates distance, the dashed line is the spacetime trajectory ("world line") of the observer. The lower quarter of the diagram shows the events that are visible to the observer, and the upper quarter shows the light cone those that will be able to see the observer. The small dots are arbitrary events in spacetime. The slope of the world line (deviation from being vertical) gives the relative velocity to the observer. Note how the view of spacetime changes when the observer accelerates.]] Relativity theory depends on "reference frames". The term reference frame as used here is an observational perspective in space at rest, or in uniform motion, from which a position can be measured along 3 spatial axes. In addition, a reference frame has the ability to determine measurements of the time of events using a 'clock' (any reference device with uniform periodicity).
An event is an occurrence that can be assigned a single unique time and location in space relative to a reference frame: it is a "point" in spacetime. Since the speed of light is constant in relativity in each and every reference frame, pulses of light can be used to unambiguously measure distances and refer back the times that events occurred to the clock, even though light takes time to reach the clock after the event has transpired.
For example, the explosion of a firecracker may be considered to be an "event". We can completely specify an event by its four spacetime coordinates: The time of occurrence and its 3dimensional spatial location define a reference point. Let's call this reference frame S.
In relativity theory we often want to calculate the position of a point from a different reference point.
Suppose we have a second reference frame S', whose spatial axes and clock exactly coincide with that of S at time zero, but it is moving at a constant velocity $v\backslash ,$ with respect to S along the $x\backslash ,$axis.
Since there is no absolute reference frame in relativity theory, a concept of 'moving' doesn't strictly exist, as everything is always moving with respect to some other reference frame. Instead, any two frames that move at the same speed in the same direction are said to be comoving. Therefore S and S' are not comoving.
Let's define the event to have spacetime coordinates $(t,\; x,\; y,\; z)\backslash ,$ in system S and $(t\text{'},\; x\text{'},\; y\text{'},\; z\text{'})\backslash ,$ in S'. Then the Lorentz transformation specifies that these coordinates are related in the following way:
t' = \gamma \left(t  \frac{v x}{c^{2}} \right) \\ x' = \gamma (x  v t) \\ y' = y \\ z' = z , \end{cases} where $\backslash gamma\; =\; \backslash frac\{1\}\{\backslash sqrt\{1\; \; \backslash frac\{v^2\}\{c^2\}\}\}$ is called the Lorentz factor and $c\backslash ,$ is the speed of light in a vacuum.
The $y\backslash ,$ and $z\backslash ,$ coordinates are unaffected, only the $x\backslash ,$ and $t\backslash ,$ axes transformed. These Lorentz transformations form a oneparameter group of linear mappings, that parameter being called rapidity.
A quantity invariant under Lorentz transformations is known as a Lorentz scalar.
The Lorentz transformation given above is for the particular case in which the velocity $v$ of S' with respect to S is parallel to the $x\backslash ,$axis. We now give the Lorentz transformation in the general case. Suppose the velocity of S' with respect to S is $\backslash mathbf\{v\}$. Denote the spacetime coordinates of an event in S by $(t,\backslash mathbf\{r\})$ (instead of $(t,x,y,z)$). Then the coordinates $(t\text{'},\backslash mathbf\{r\}\text{'})$ of this event in S' are given by:
where $\backslash mathbf\{v\}^T$ denotes the transpose of $\backslash mathbf\{v\}$, $\backslash alpha\_\{\backslash mathbf\{v\}\}=\backslash frac\{1\}\{\backslash gamma(\backslash mathbf\{v\})\}$, and $P\_\{\backslash mathbf\{v\}\}$ denotes the projection onto the direction of $\backslash mathbf\{v\}$.
From the first equation of the Lorentz transformation in terms of coordinate differences
it is clear that two events that are simultaneous in frame S (satisfying $\backslash Delta\; t\; =\; 0\backslash ,$), are not necessarily simultaneous in another inertial frame S' (satisfying $\backslash Delta\; t\text{'}\; =\; 0\backslash ,$). Only if these events are colocal in frame S (satisfying $\backslash Delta\; x\; =\; 0\backslash ,$), will they be simultaneous in another frame S'.
Writing the Lorentz transformation and its inverse in terms of coordinate differences we get
\Delta t' = \gamma \left(\Delta t  \frac{v \,\Delta x}{c^{2}} \right) \\ \Delta x' = \gamma (\Delta x  v \,\Delta t)\, \end{cases} and
\Delta t = \gamma \left(\Delta t' + \frac{v \,\Delta x'}{c^{2}} \right) \\ \Delta x = \gamma (\Delta x' + v \,\Delta t')\, \end{cases}
Suppose we have a clock at rest in the unprimed system S. Two consecutive ticks of this clock are then characterized by $\backslash Delta\; x\; =\; 0$. If we want to know the relation between the times between these ticks as measured in both systems, we can use the first equation and find:
This shows that the time $\backslash Delta\; t\text{'}$ between the two ticks as seen in the 'moving' frame S' is larger than the time $\backslash Delta\; t$ between these ticks as measured in the rest frame of the clock. This phenomenon is called time dilation.
Similarly, suppose we have a measuring rod at rest in the unprimed system. In this system, the length of this rod is written as $\backslash Delta\; x$. If we want to find the length of this rod as measured in the 'moving' system S', we must make sure to measure the distances $x\text{'}$ to the end points of the rod simultaneously in the primed frame S'. In other words, the measurement is characterized by $\backslash Delta\; t\text{'}\; =\; 0$, which we can combine with the fourth equation to find the relation between the lengths $\backslash Delta\; x$ and $\backslash Delta\; x\text{'}$:
This shows that the length $\backslash Delta\; x\text{'}$ of the rod as measured in the 'moving' frame S' is shorter than the length $\backslash Delta\; x$ in its own rest frame. This phenomenon is called length contraction or Lorentz contraction.
These effects are not merely appearances; they are explicitly related to our way of measuring time intervals between events which occur at the same place in a given coordinate system (called "colocal" events). These time intervals will be different in another coordinate system moving with respect to the first, unless the events are also simultaneous. Similarly, these effects also relate to our measured distances between separated but simultaneous events in a given coordinate system of choice. If these events are not colocal, but are separated by distance (space), they will not occur at the same spatial distance from each other when seen from another moving coordinate system. However, the spacetime interval (see spacetime#spacetime interval) will be the same for all observers. The underlying reality remains the same. Only our perspective changes.
In diagram 2 the interval AB is 'timelike'; i.e., there is a frame of reference in which event A and event B occur at the same location in space, separated only by occurring at different times. If A precedes B in that frame, then A precedes B in all frames. It is hypothetically possible for matter (or information) to travel from A to B, so there can be a causal relationship (with A the cause and B the effect).
The interval AC in the diagram is 'spacelike'; i.e., there is a frame of reference in which event A and event C occur simultaneously, separated only in space. However there are also frames in which A precedes C (as shown) and frames in which C precedes A. If it were possible for a causeandeffect relationship to exist between events A and C, then paradoxes of causality would result. For example, if A was the cause, and C the effect, then there would be frames of reference in which the effect preceded the cause. Although this in itself won't give rise to a paradox, one can show^{[24]}^{[25]} that faster than light signals can be sent back into one's own past. A causal paradox can then be constructed by sending the signal if and only if no signal was received previously.
Therefore, one of the consequences of special relativity is that (assuming causality is to be preserved), no information or material object can travel faster than light. On the other hand, the logical situation is not as clear in the case of general relativity, so it is an open question whether there is some fundamental principle that preserves causality (and therefore prevents motion faster than light) in general relativity.
Even without considerations of causality, there are other strong reasons why fasterthanlight travel is forbidden by special relativity. For example, if a constant force is applied to an object for a limitless amount of time, then integrating F = dp/dt gives a momentum that grows without bound, but this is simply because $p\; =\; m\; \backslash gamma\; v\; \backslash ,$ approaches infinity as v approaches c. To an observer who is not accelerating, it appears as though the object's inertia is increasing, so as to produce a smaller acceleration in response to the same force. This behavior is in fact observed in particle accelerators.
If the observer in S sees an object moving along the x axis at velocity w, then the observer in the S' system, a frame of reference moving at velocity v in the x direction with respect to S, will see the object moving with velocity w' where
This equation can be derived from the space and time transformations above.
Notice that if the object were moving at the speed of light in the S system (i.e. $w=c$), then it would also be moving at the speed of light in the S' system. Also, if both w and v are small with respect to the speed of light, we will recover the intuitive Galilean transformation of velocities: $w\text{'}\; \backslash approx\; wv$.
The usual example given is that of a train (call it system $K$) travelling due east with a velocity $v$ with respect to the tracks (system $K\text{'}$). A child inside the train throws a baseball due east with a velocity $u$ with respect to the train. In classical physics, an observer at rest on the tracks will measure the velocity of the baseball as $v+u$.
In special relativity, this is no longer true. Instead, an observer on the tracks will measure the velocity of the baseball as $\backslash frac\{v+u\}\{1+\backslash frac\{vu\}\{c^2\}\}$. If $u$ and $v$ are small compared to $c$, then the above expression approaches the classical sum $v+u$.
In the more general case, the baseball is not necessarily travelling in the same direction as the train. To obtain the general formula for Einstein velocity addition, suppose an observer at rest in system $K$ measures the velocity of an object as $\backslash mathbf\{u\}$. Let $K\text{'}$ be an inertial system such that the relative velocity of $K$ to $K\text{'}$ is $\backslash mathbf\{v\}$, where $\backslash mathbf\{u\}$ and $\backslash mathbf\{v\}$ are now vectors in $R^3$. An observer at rest in $K\text{'}$ will then measure the velocity of the object as ^{[16]}
where $\backslash mathbf\{u\}\_\{\backslash parallel\}$ and $\backslash mathbf\{u\}\_\{\backslash perp\}$ are the components of $\backslash mathbf\{u\}$ parallel and perpendicular, respectively, to $\backslash mathbf\{v\}$, and $\backslash alpha\_\{\backslash mathbf\{v\}\}=\backslash frac\{1\}\{\backslash gamma(\backslash mathbf\{v\})\}=\backslash sqrt\{1\backslash frac\{\backslash mathbf\{v\}^2\}\{c^2\}\}$.
Note that the Einstein velocity addition is commutative only when $\backslash mathbf\{v\}$ and $\backslash mathbf\{u\}$ are parallel. In fact,
where $gyr$ is A.A. Ungar's gyration operator.^{[26]}
In addition to modifying notions of space and time, special relativity forces one to reconsider the concepts of mass, momentum, and energy, all of which are important constructs in Newtonian mechanics. Special relativity shows, in fact, that these concepts are all different aspects of the same physical quantity in much the same way that it shows space and time to be interrelated.
There are a couple of (equivalent) ways to define momentum and energy in SR. One method uses conservation laws. If these laws are to remain valid in SR they must be true in every possible reference frame. However, if one does some simple thought experiments using the Newtonian definitions of momentum and energy, one sees that these quantities are not conserved in SR. One can rescue the idea of conservation by making some small modifications to the definitions to account for relativistic velocities. It is these new definitions which are taken as the correct ones for momentum and energy in SR.
The energy and momentum of an object with invariant mass m (also called rest mass in the case of a single particle), moving with velocity v with respect to a given frame of reference, are given by
E &= \gamma m c^2 \\ \mathbf{p} &= \gamma m \mathbf{v} \end{cases} respectively, where γ (the Lorentz factor) is given by
The quantity γm is often called the relativistic mass of the object in the given frame of reference, ^{[27]} although recently this concept is falling in disuse, and Lev B. Okun suggested that "this terminology [...] has no rational justification today", and should no longer be taught. ^{[28]} Other physicists, including Wolfgang Rindler and T. R. Sandin, have argued that relativistic mass is a useful concept and there is little reason to stop using it. ^{[29]} See Mass in special relativity for more information on this debate. Some authors use the symbol m to refer to relativistic mass, and the symbol m_{0} to refer to rest mass. ^{[30]}
The energy and momentum of an object with invariant mass m are related by the formulas
The first is referred to as the relativistic energymomentum equation. While the energy E and the momentum p depend on the frame of reference in which they are measured, the quantity E^{2} − (pc)^{2} is invariant, being equal to the squared invariant mass of the object (up to the multiplicative constant c^{4}).
It should be noted that the invariant mass of a system
is greater than the sum of the rest masses of the particles it is composed of (unless they are all stationary with respect to the center of mass of the system, and hence to each other). The sum of rest masses is not even always conserved in closed systems, since rest mass may be converted to particles which individually have no mass, such as photons. Invariant mass, however, is conserved and invariant for all observers, so long as the system remains closed. This is due to the fact that even massless particles contribute invariant mass to systems, as also does the kinetic energy of particles. Thus, even under transformations of rest mass to photons or kinetic energy, the invariant mass of a system which contains these energies still reflects the invariant mass associated with them.
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For massless particles, m is zero. The relativistic energymomentum equation still holds, however, and by substituting m with 0, the relation E = pc is obtained; when substituted into Ev = c^{2}p, it gives v = c: massless particles (such as photons) always travel at the speed of light.
A particle which has no rest mass (for example, a photon) can nevertheless contribute to the total invariant mass of a system, since some or all of its momentum is canceled by another particle, causing a contribution to the system's invariant mass due to the photon's energy. For single photons this does not happen, since the energy and momentum terms exactly cancel.
Looking at the above formula for invariant mass of a system, one sees that, when a single massive object is at rest (v = 0, p = 0), there is a nonzero mass remaining: $m\_\backslash text\{rest\}\; =\; E/c^2.$ The corresponding energy, which is also the total energy when a single particle is at rest, is referred to as "rest energy". In systems of particles which are seen from a moving inertial frame, total energy increases and so does momentum. However, for single particles the rest mass remains constant, and for systems of particles the invariant mass remain constant, because in both cases, the energy and momentum increases subtract from each other, and cancel. Thus, the invariant mass of systems of particles is a calculated constant for all observers, as is the rest mass of single particles.
For systems, the inertial frame in which the momenta of all particles sums to zero is called the center of momentum frame. In this special frame, the relativistic energymomentum equation has p = 0, and thus gives the invariant mass of the system as merely the total energy of all parts of the system, divided by c^{2}
This is the invariant mass of any system which is measured in a frame where it has zero total momentum, such as a bottle of hot gas on a scale. In such a system, the mass which the scale weighs is the invariant mass, and it depends on the total energy of the system. It is thus more than the sum of the rest masses of the molecules, but also includes all the totaled energies in the system as well. Like energy and momentum, the invariant mass of closed systems cannot be changed so long as the system is closed, because the total relativistic energy of the system remains constant so long as nothing can enter or leave it.
An increase in the energy of such a system which is caused by translating the system to an inertial frame which is not the center of momentum frame, causes an increase in energy and momentum without an increase in invariant mass. Einstein's famous E = mc^2 equation, however, applies only to closed systems in their centerofmomentum frame where momentum sums to zero.
Taking this formula at face value, we see that in relativity, mass is simply another form of energy. In 1927 Einstein remarked about special relativity: Under this theory mass is not an unalterable magnitude, but a magnitude dependent on (and, indeed, identical with) the amount of energy.^{[31]}
Einstein was not referring to closed systems in this remark, however. For, even in his 1905 paper, which first derived the relationship between mass and energy, Einstein showed that the energy of an object had to be increased for its invariant mass (rest mass) to increase. In such cases, the system is not closed (in Einstein's thought experiment, for example, a mass gives off two photons, which are lost).
In a closed system the total energy, the total momentum, and hence the total invariant mass are conserved. Einstein's formula for change in mass translates to its simplest ΔE = mc^{2} form, however, in nonclosed systems in which energy, and thus invariant mass, is allowed to escape (for example, as heat and light). Einstein's equation shows that such systems must lose mass, in accordance with the above formula, in proportion to the energy they lose to the surroundings. Conversely, if one can measure the differences in mass between a system before it undergoes a reaction which releases heat and light, and the system after the reaction when heat and light have escaped, one can estimate the amount of energy which escapes the system. In both nuclear and chemical reactions, such energy represents the difference in binding energies of electrons in atoms (for chemistry) or between nucleons in nuclei (in atomic reactions). In both cases, the mass difference between reactants and (cooled) products measures the mass of heat and light which will escape the reaction, and thus (using the equation) give the equivalent energy of heat and light which may be emitted if the reaction proceeds.
In chemistry, the mass differences associated with the emitted energy are too small to measure. However, in nuclear reactions the energies are so large that they are associated with mass differences, which can be estimated in advance, if the products and reactants have been weighed (atoms can be weighed indirectly by using atomic masses, which are always the same for each nuclide). Thus, Einstein's formula becomes important when one has measured the masses of different atomic nuclei. By looking at the difference in masses, one can predict which nuclei have stored energy that can be released by certain nuclear reactions, providing important information which was useful in the development of nuclear energy and, consequently, the nuclear bomb. Historically, for example, Lise Meitner was able to use the mass differences in nuclei to estimate that there was enough energy available to make nuclear fission a favorable process. The implications of this special form of Einstein's formula have thus made it one of the most famous equations in all of science.
Because the E = mc^{2} equation applies to systems only in their center of momentum frame, it has been popularly misunderstood to mean that mass may be converted to energy, after which the mass disappears. This is incorrect, as for closed systems, mass never disappears in the center of momentum frame, because energy cannot disappear. Instead, this equation, in context, means only that when any energy is added to, or escapes from, a system in the centerofmomentum frame, the system will be measured as having gained or lost mass, in proportion to energy added or removed. Thus, in theory, if even an atomic bomb were placed in a box strong enough to hold its blast, and detonated upon a scale, the mass of this closed system would not change, and the scale would not move. Only when a transparent "window" was opened in the superstrong plasmafilled box, and light and heat were allowed to escape in a beam, and the bomb components to cool, would the system lose the mass associated with the energy of the blast. In a 21 kiloton bomb, for example, about a gram of light and heat is created. If this heat and light were allowed to escape, the remains of the bomb would lose a gram of mass, as it cooled. However, invariant mass cannot be destroyed in special relativity, but only moved from place to place. In this thoughtexperiment, the light and heat carry away the gram of mass, and would therefore deposit this gram of mass in the objects that absorb them.
In special relativity, Newton's second law does not hold in its form F = ma, but it does if it is expressed as
where p is the momentum as defined above ($\backslash mathbf\{p\}=\; \backslash gamma\; m\; \backslash mathbf\{v\}$) and "m" is the invariant mass. Thus, the force is given by
Carrying out the derivatives gives
which, taking into account the identity $v\; \backslash tfrac\{dv\}\{dt\}=\; \backslash mathbf\{v\}\; \backslash cdot\; \backslash mathbf\{a\}$, can also be expressed as
If the acceleration is separated into the part parallel to the velocity and the part perpendicular to it, one gets
Consequently in some old texts, γ^{3}m is referred to as the longitudinal mass, and γm is referred to as the transverse mass, which is the same as the relativistic mass. See mass in special relativity.
For the fourforce, see below.
The Workenergy Theorem says^{[32]} the change in kinetic energy is equal to the work done on the body, that is
If in the initial state the body was at rest (γ_{0} = 1) and in the final state it has speed v (γ_{1} = γ), the kinetic energy is K = (γ − 1)mc^{2}, a result that can be directly obtained by subtracting the rest energy mc^{2} from the total relativistic energy γmc^{2}.
The application of the above in cyclotrons is immediate:^{[33]}^{[34]}^{[35]}^{[36]}^{[37]}^{[38]}^{[39]}^{[40]}^{[41]}^{[42]}^{[43]}
In the presence of a magnetic field only, the Lorentz force is:
Since:
it follows that:
meaning that γ is constant, and so is v. This is instrumental in solving the equation of motion for a charge particle of charge q in a magnetic field of induction B as follows:
On the other hand:
Thus:
Separating by components, we obtain:
The solutions are:
By integrating one more time with respect to t the differential equations above we obtain the equations of motion: a circle of radius $r=\backslash frac\{\backslash gamma(v\_0)m\_0v\_0\}\{qB\}$ in the plane z=constant, where $v\_0$ is the initial speed of the particle entering the cyclotron. Notice that this calculation ignores the AbrahamLorentz force which is the reaction to the emission of electromagnetic radiation by the particle. If the speed is held constant by applying an electric field, then the magnitude of the acceleration is constant, $a\; =\; \backslash frac\{\{v\_0\}^2\}\{r\}\backslash ,,$ but its direction keeps changing in a cyclotron. The jerk is proportional with the second time derivative of speed:
Because the jerk is directed opposite to the velocity, the AbrahamLorentz force tends to slow the particle down. Note that the AbrahamLorentz force is much smaller than the Lorentz force:
so, it can be ignored in most computations.
Notice that γ can be expanded into a Taylor series for $\backslash frac\{v^2\}\{c^2\}\; <\; 1$, obtaining:
and consequently
For velocities much smaller than that of light, one can neglect the terms with c^{2} and higher in the denominator. These formulas then reduce to the standard definitions of Newtonian kinetic energy and momentum. This is as it should be, for special relativity must agree with Newtonian mechanics at low velocities.
SR uses a 'flat' 4dimensional Minkowski space, which is an example of a spacetime. This space, however, is very similar to the standard 3 dimensional Euclidean space, and fortunately by that fact, very easy to work with.
The differential of distance (ds) in cartesian 3D space is defined as:
where $(dx\_1,dx\_2,dx\_3)$ are the differentials of the three spatial dimensions. In the geometry of special relativity, a fourth dimension is added, derived from time, so that the equation for the differential of distance becomes:
If we wished to make the time coordinate look like the space coordinates, we could treat time as imaginary: x_{4} = ict . In this case the above equation becomes symmetric:
This suggests what is in fact a profound theoretical insight as it shows that special relativity is simply a rotational symmetry of our spacetime, very similar to rotational symmetry of Euclidean space. Just as Euclidean space uses a Euclidean metric, so spacetime uses a Minkowski metric. Basically, SR can be stated in terms of the invariance of spacetime interval (between any two events) as seen from any inertial reference frame. All equations and effects of special relativity can be derived from this rotational symmetry (the Poincaré group) of Minkowski spacetime. According to Misner (1971 §2.3), ultimately the deeper understanding of both special and general relativity will come from the study of the Minkowski metric (described below) rather than a "disguised" Euclidean metric using ict as the time coordinate.
If we reduce the spatial dimensions to 2, so that we can represent the physics in a 3D space
we see that the null geodesics lie along a dualcone:
defined by the equation
or simply
— which is the equation of a circle with r=c×dt. If we extend this to three spatial dimensions, the null geodesics are the 4dimensional cone:
This null dualcone represents the "line of sight" of a point in space. That is, when we look at the stars and say "The light from that star which I am receiving is X years old", we are looking down this line of sight: a null geodesic. We are looking at an event a distance $d\; =\; \backslash sqrt\{x\_1^2+x\_2^2+x\_3^2\}$ away and a time d/c in the past. For this reason the null dual cone is also known as the 'light cone'. (The point in the lower left of the picture below represents the star, the origin represents the observer, and the line represents the null geodesic "line of sight".)
The cone in the t region is the information that the point is 'receiving', while the cone in the +t section is the information that the point is 'sending'.
The geometry of Minkowski space can be depicted using Minkowski diagrams, which are useful also in understanding many of the thoughtexperiments in special relativity.
Here, we see how to write the equations of special relativity in a manifestly Lorentz covariant form. The position of an event in spacetime is given by a contravariant four vector whose components are:
where $x^1\; =\; x$ and $x^2\; =\; y$ and $x^3\; =\; z$ as usual. We define $x^0\; =\; ct$ so that the time coordinate has the same dimension of distance as the other spatial dimensions; in accordance with the general principle that space and time are treated equally, so far as possible.^{[44]}^{[45]}^{[46]} Superscripts are contravariant indices in this section rather than exponents except when they indicate a square. Subscripts are covariant indices which also range from zero to three as with the spacetime gradient of a field φ:
Having recognised the fourdimensional nature of spacetime, we are driven to employ the Minkowski metric, η, given in components (valid in any inertial reference frame) as:
1 & 0 & 0 & 0\\ 0 & 1 & 0 & 0\\ 0 & 0 & 1 & 0\\ 0 & 0 & 0 & 1 \end{pmatrix}
which is equal to its reciprocal, $\backslash eta^\{\backslash alpha\backslash beta\}$, in those frames.
Then we recognize that coordinate transformations between inertial reference frames are given by the Lorentz transformation tensor Λ. For the special case of motion along the xaxis, we have:
\gamma & \beta\gamma & 0 & 0\\ \beta\gamma & \gamma & 0 & 0\\ 0 & 0 & 1 & 0\\ 0 & 0 & 0 & 1 \end{pmatrix}
which is simply the matrix of a boost (like a rotation) between the x and ct coordinates. Where μ' indicates the row and ν indicates the column. Also, β and γ are defined as:
More generally, a transformation from one inertial frame (ignoring translations for simplicity) to another must satisfy:
where there is an implied summation of $\backslash mu\text{'}\; \backslash !$ and $\backslash nu\text{'}\; \backslash !$ from 0 to 3 on the righthand side in accordance with the Einstein summation convention. The Poincaré group is the most general group of transformations which preserves the Minkowski metric and this is the physical symmetry underlying special relativity.
All proper physical quantities are given by tensors. So to transform from one frame to another, we use the wellknown tensor transformation law
\Lambda^{i_1'}{}_{i_1}\Lambda^{i_2'}{}_{i_2}\cdots\Lambda^{i_p'}{}_{i_p} \Lambda_{j_1'}{}^{j_1}\Lambda_{j_2'}{}^{j_2}\cdots\Lambda_{j_q'}{}^{j_q} T^{\left[i_1,i_2,\dots,i_p\right]}_{\left[j_1,j_2,\dots,j_q\right]}
Where $\backslash Lambda\_\{j\_k\text{'}\}\{\}^\{j\_k\}\; \backslash !$ is the reciprocal matrix of $\backslash Lambda^\{j\_k\text{'}\}\{\}\_\{j\_k\}\; \backslash !$.
To see how this is useful, we transform the position of an event from an unprimed coordinate system S to a primed system S', we calculate
\begin{pmatrix} ct'\\ x'\\ y'\\ z' \end{pmatrix} = x^{\mu'}=\Lambda^{\mu'}{}_\nu x^\nu= \begin{pmatrix} \gamma & \beta\gamma & 0 & 0\\ \beta\gamma & \gamma & 0 & 0\\ 0 & 0 & 1 & 0\\ 0 & 0 & 0 & 1 \end{pmatrix} \begin{pmatrix} ct\\ x\\ y\\ z \end{pmatrix} = \begin{pmatrix} \gamma ct \gamma\beta x\\ \gamma x  \beta \gamma ct \\ y\\ z \end{pmatrix}
which is the Lorentz transformation given above. All tensors transform by the same rule.
The squared length of the differential of the position fourvector $dx^\backslash mu\; \backslash !$ constructed using
is an invariant. Being invariant means that it takes the same value in all inertial frames, because it is a scalar (0 rank tensor), and so no Λ appears in its trivial transformation. Notice that when the line element $\backslash mathbf\{dx\}^2$ is negative that $d\backslash tau=\backslash sqrt\{\backslash mathbf\{dx\}^2\}\; /\; c$ is the differential of proper time, while when $\backslash mathbf\{dx\}^2$ is positive, $\backslash sqrt\{\backslash mathbf\{dx\}^2\}$ is differential of the proper distance.
The primary value of expressing the equations of physics in a tensor form is that they are then manifestly invariant under the Poincaré group, so that we do not have to do a special and tedious calculation to check that fact. Also in constructing such equations we often find that equations previously thought to be unrelated are, in fact, closely connected being part of the same tensor equation.
Recognising other physical quantities as tensors also simplifies their transformation laws. First note that the velocity fourvector U^{μ} is given by
Recognising this, we can turn the awkward looking law about composition of velocities into a simple statement about transforming the velocity fourvector of one particle from one frame to another. U^{μ} also has an invariant form:
So all velocity fourvectors have a magnitude of c. This is an expression of the fact that there is no such thing as being at coordinate rest in relativity: at the least, you are always moving forward through time. The acceleration 4vector is given by $A^\backslash mu\; =\; d\{\backslash mathbf\; U^\backslash mu\}/d\backslash tau$. Given this, differentiating the above equation by τ produces
So in relativity, the acceleration fourvector and the velocity fourvector are orthogonal.
The momentum and energy combine into a covariant 4vector:
E/c \\ p_x\\ p_y\\ p_z\end{pmatrix}.
where m is the invariant mass.
The invariant magnitude of the momentum 4vector is:
We can work out what this invariant is by first arguing that, since it is a scalar, it doesn't matter which reference frame we calculate it, and then by transforming to a frame where the total momentum is zero.
We see that the rest energy is an independent invariant. A rest energy can be calculated even for particles and systems in motion, by translating to a frame in which momentum is zero.
The rest energy is related to the mass according to the celebrated equation discussed above:
Note that the mass of systems measured in their center of momentum frame (where total momentum is zero) is given by the total energy of the system in this frame. It may not be equal to the sum of individual system masses measured in other frames.
To use Newton's third law of motion, both forces must be defined as the rate of change of momentum with respect to the same time coordinate. That is, it requires the 3D force defined above. Unfortunately, there is no tensor in 4D which contains the components of the 3D force vector among its components.
If a particle is not traveling at c, one can transform the 3D force from the particle's comoving reference frame into the observer's reference frame. This yields a 4vector called the fourforce. It is the rate of change of the above energy momentum fourvector with respect to proper time. The covariant version of the fourforce is:
where $\backslash tau\; \backslash ,$ is the proper time.
In the rest frame of the object, the time component of the four force is zero unless the "invariant mass" of the object is changing (this requires a nonclosed system in which energy/mass is being directly added or removed from the object) in which case it is the negative of that rate of change of mass, times c. In general, though, the components of the four force are not equal to the components of the threeforce, because the three force is defined by the rate of change of momentum with respect to coordinate time, i.e. $\backslash frac\{d\; p\}\{d\; t\}$ while the four force is defined by the rate of change of momentum with respect to proper time, i.e. $\backslash frac\{d\; p\}\; \{d\; \backslash tau\}$.
In a continuous medium, the 3D density of force combines with the density of power to form a covariant 4vector. The spatial part is the result of dividing the force on a small cell (in 3space) by the volume of that cell. The time component is −1/c times the power transferred to that cell divided by the volume of the cell. This will be used below in the section on electromagnetism.
Theoretical investigation in classical electromagnetism led to the discovery of wave propagation. Equations generalizing the electromagnetic effects found that finite propagationspeed of the E and B fields required certain behaviors on charged particles. The general study of moving charges forms the Liénard–Wiechert potential, which is a step towards special relativity.
The Lorentz transformation of the electric field of a moving charge into a nonmoving observer's reference frame results in the appearance of a mathematical term commonly called the magnetic field. Conversely, the magnetic field generated by a moving charge disappears and becomes a purely electrostatic field in a comoving frame of reference. Maxwell's equations are thus simply an empirical fit to special relativistic effects in a classical model of the Universe. As electric and magnetic fields are reference frame dependent and thus intertwined, one speaks of electromagnetic fields. Special relativity provides the transformation rules for how an electromagnetic field in one inertial frame appears in another inertial frame.
Maxwell's equations in the 3D form are already consistent with the physical content of special relativity. But we must rewrite them to make them manifestly invariant.^{[47]}
The charge density $\backslash rho\; \backslash !$ and current density $[J\_x,J\_y,J\_z]\; \backslash !$ are unified into the currentcharge 4vector:
\rho c \\ J_x\\ J_y\\ J_z\end{pmatrix}.
The law of charge conservation, $\backslash frac\{\backslash partial\; \backslash rho\}\; \{\backslash partial\; t\}\; +\; \backslash nabla\; \backslash cdot\; \backslash mathbf\{J\}\; =\; 0$, becomes:
The electric field $[E\_x,E\_y,E\_z]\; \backslash !$ and the magnetic induction $[B\_x,B\_y,B\_z]\; \backslash !$ are now unified into the (rank 2 antisymmetric covariant) electromagnetic field tensor:
F_{\mu\nu} = \begin{pmatrix} 0 & E_x/c & E_y/c & E_z/c \\ E_x/c & 0 & B_z & B_y \\ E_y/c & B_z & 0 & B_x \\ E_z/c & B_y & B_x & 0 \end{pmatrix}.
The density, $f\_\backslash mu\; \backslash !$, of the Lorentz force, $\backslash mathbf\{f\}\; =\; \backslash rho\; \backslash mathbf\{E\}\; +\; \backslash mathbf\{J\}\; \backslash times\; \backslash mathbf\{B\}$, exerted on matter by the electromagnetic field becomes:
Faraday's law of induction, $\backslash nabla\; \backslash times\; \backslash mathbf\{E\}\; =\; \backslash frac\{\backslash partial\; \backslash mathbf\{B\}\}\; \{\backslash partial\; t\}$, and Gauss's law for magnetism, $\backslash nabla\; \backslash cdot\; \backslash mathbf\{B\}\; =\; 0$, combine to form:
\partial_\nu F_{\lambda \mu} = 0. \!
Although there appear to be 64 equations here, it actually reduces to just four independent equations. Using the antisymmetry of the electromagnetic field one can either reduce to an identity (0=0) or render redundant all the equations except for those with λ,μ,ν = either 1,2,3 or 2,3,0 or 3,0,1 or 0,1,2.
The electric displacement $[D\_x,D\_y,D\_z]\; \backslash !$ and the magnetic field $[H\_x,H\_y,H\_z]\; \backslash !$ are now unified into the (rank 2 antisymmetric contravariant) electromagnetic displacement tensor:
\mathcal{D}^{\mu\nu} = \begin{pmatrix} 0 & D_xc & D_yc & D_zc \\ D_xc & 0 & H_z & H_y \\ D_yc & H_z & 0 & H_x \\ D_zc & H_y & H_x & 0 \end{pmatrix}.
Ampère's law, $\backslash nabla\; \backslash times\; \backslash mathbf\{H\}\; =\; \backslash mathbf\{J\}\; +\; \backslash frac\{\backslash partial\; \backslash mathbf\{D\}\}\; \{\backslash partial\; t\}$, and Gauss's law, $\backslash nabla\; \backslash cdot\; \backslash mathbf\{D\}\; =\; \backslash rho$, combine to form:
In a vacuum, the constitutive equations are:
Antisymmetry reduces these 16 equations to just six independent equations. Because it is usual to define $F^\{\backslash mu\; \backslash nu\}\backslash ,$ by
the constitutive equations may, in a vacuum, be combined with Ampère's law etc. to get:
The energy density of the electromagnetic field combines with Poynting vector and the Maxwell stress tensor to form the 4D electromagnetic stressenergy tensor. It is the flux (density) of the momentum 4vector and as a rank 2 mixed tensor it is:
where $\backslash delta\_\backslash alpha^\backslash pi$ is the Kronecker delta. When upper index is lowered with η, it becomes symmetric and is part of the source of the gravitational field.
The conservation of linear momentum and energy by the electromagnetic field is expressed by:
where $f\_\backslash mu\; \backslash !$ is again the density of the Lorentz force. This equation can be deduced from the equations above (with considerable effort).
Special relativity is accurate only when gravitational potential is much less than c^{2}; in a strong gravitational field one must use general relativity (which becomes special relativity at the limit of weak field). At very small scales, such as at the Planck length and below, quantum effects must be taken into consideration resulting in quantum gravity. However, at macroscopic scales and in the absence of strong gravitational fields, special relativity is experimentally tested to extremely high degree of accuracy (10^{–20})^{[48]} and thus accepted by the physics community. Experimental results which appear to contradict it are not reproducible and are thus widely believed to be due to experimental errors.
Special relativity is mathematically selfconsistent, and it is an organic part of all modern physical theories, most notably quantum field theory, string theory, and general relativity (in the limiting case of negligible gravitational fields).
Newtonian mechanics mathematically follows from special relativity at small velocities (compared to the speed of light)  thus Newtonian mechanics can be considered as a special relativity of slow moving bodies. See Status of special relativity for a more detailed discussion.
Several experiments predating Einstein's 1905 paper are now interpreted as evidence for relativity. (Of these, Einstein was only aware of the Fizeau experiment before 1905.)
A number of experiments have been conducted to test special relativity against rival theories. These include:
In addition, particle accelerators routinely accelerate and measure the properties of particles moving at near the speed of light, where their behavior is completely consistent with relativity theory and inconsistent with the earlier Newtonian mechanics. These machines would simply not work if they were not engineered according to relativistic principles.
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Special relativity (or the special theory of relativity) was developed and explained by Albert Einstein in 1905 because he was unhappy with the explanations of electromagnetism used in the physics of the time. Einstein believed that these physics theories gave unspoken preference to one group of observers (i.e., viewers) over another group of observers. Galileo had established the principle of relativity according to which physics phenomena must look the same to all observers, and no observer can be said to have the "right" way to look at the things studied by physics.
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Suppose you are moving toward something that is moving toward you. If you measure its speed, it will seem to be moving faster than if you were stopped. Now suppose you are moving away from something that is moving toward you. If you measure its speed again, it will seem to be moving more slowly. This is the idea of "relative speed."
Before Einstein, scientists were trying to measure the "relative speed" of light. They were doing this by measuring the speed of starlight reaching the Earth. They expected that if the Earth were moving toward a star, the light from that star should seem faster than if the Earth were moving away from that star.
They noticed that no matter who performed the experiments, where they were performed, or what starlight they used, the measured speed of light was always the same.
Einstein said this happens because there is something unexpected about distance and time. He thought that as the Earth moves through space, our clocks slow down (ever so slightly). Any clock used to measure the speed of light is off by exactly the right amount to make light seem to be moving at its regular speed. Mentally constructing a "light clock" allow us to see exactly how to explain this remarkable fact.
Also, Einstein said that as the Earth moves through space, our measuring devices change length (ever so slightly). So, any measuring device used to measure the speed of light is off by exactly the right amount to make the starlight seem to be moving at its regular speed.
Other scientists before Einstein had written about light seeming to go the same speed no matter how it was observed. The idea that made Einstein's relativity so revolutionary is that light does not just seem to go the same speed, it is always going the same speed no matter how an observer is moving.
The mathematical basis of special relativity are the Lorentz Transformations, which mathematically describe the views of space and time for two observers who are moving with respect to each other but are not experiencing acceleration.
Let there be an observer K who describes when events occur with a time coordinate t, and who describes where events occur with spatial coordinates x, y, and z. This is mathematically defining the first observer whose "point of view" will be our first reference.
Let us specify that the time of an event is given: by the time that it is observed_{(observed)} (say today, at 12 o'clock) minus the time that it took for the observation to reach us:
 which can be calculated as:
 the distance from the observer to the event d_{(observed)}
 (say the event is on a star which is 1 light year away, so it takes the light 1 year to reach the observer)
 divided by c (which is the speed of light  a very large number in miles per hour).
 This is correct because distance, divided by speed gives the time it takes to go that distance at that speed (e.g. 30 miles divided by 10 mph: give us 3 hours, because if you go at 10 mph for 3 hours, you reach 30 miles).
So we have:
This is mathematically defining what any "time" means for any observer.
let there be another observer K' who is
where x' axis is coincident with the x axis, and with the y' and z' axes  "always being parallel" to the y and z axes,
and
The Lorentz Transformations then are
In special relativity, the momentum p and the energy E of an object as a function of its rest mass m_{0} are
and
These equations can be rewritten to use a "relativistic mass" (in the direction of motion) of $m=\backslash frac\; \{m\_0\}\; \{\backslash sqrt\{1\; \; \backslash frac\; \{v^2\}\{c^2\}\}\}$. In this case, one finds that momentum is still described by p = mv, while energy is described by the famous equation E = mc^{2}.
In special relativity, energy and momentum are related by the equation
For a massless particle (such as a photon of light), $m\_0\; =\; 0$ and this equation becomes E = pc.
The need for special relativity arose from Maxwell's equations of electromagnetism, which were published in 1865. It was later found that they call for electromagnetic waves (such as light) to move at a constant speed (i.e., the speed of light).
To have James Clerk Maxwell's Equations be consistent with both astronomical observations^{[1]} and Newtonian physics^{[2]}, Maxwell proposed in 1877 that light travels through an ether which permeates the universe.
In 1887, the famous MichelsonMorley experiment tried to detect the "ether wind" generated by the movement of the Earth^{[3]}. The persistent null results of this experiment puzzled physicists, and called the ether theory into question.
In 1895, Lorentz and Fitzgerald noted that the null result of the MichelsonMorley experiment could be explained by the ether wind contracting the experiment in the direction of motion of the ether. This effect is called the Lorentz contraction, and (without ether) is a consequence of special relativity.
In 1899, Lorentz first published the Lorentz Equations. Although this was not the first time they had been published, this was the first time that they were used as an explanation of the MichelsonMorley experiment's null result, since the Lorentz contraction is a result of them.
In 1900, Poincare gave a famous speech in which he considered the possibility that some "new physics" was needed to explain the MichelsonMorley experiment.
In 1904, Lorentz showed that electrical and magnetic fields can be modified into each other through the Lorentz transformations.
In 1905, Einstein published his article introducing special relativity, "On the Electrodynamics of Moving Bodies", in Annalen der Physik. In this article, he presented the postulates of relativity, derived the Lorentz transformations from them, and (unaware of Lorentz's 1904 article) also showed how the Lorentz Transformations affect electric and magnetic fields.
Later in 1905, Einstein published another article presenting E = mc^{2}.
In 1908, Max Planck endorsed Einstein's theory and named it "relativity". In that same year, Minkowski gave a famous speech on Space and Time in which he showed that relativity is selfconsistent and further developed the theory. These events forced the physics community to take relativity seriously. Relativity came to be more and more accepted after that.
In 1912 Einstein and Lorentz were nominated for the Nobel prize in physics due to their pioneering work on relativity. Unfortunately, relativity remained so controversial then, and for a long time after that, that a Nobel prize was never awarded for it.
