In physics, action is an attribute of the dynamics of a physical system. It is a mathematical functional which takes the trajectory, also called path or history, of the system as its argument and has a real number as its result. Generally, the action takes different values for different paths.^{[1]} Action has the dimensions of [energy]·[time], and its SI unit is joulesecond. This is the same unit as that of angular momentum.
Introduction
Empirical laws are frequently expressed as differential equations, which describe how physical quantities such as position and momentum change continuously with time. Given the initial and boundary conditions for the situation, the "solution" to these empirical equations is an implicit function describing the behavior of the system.
There is an alternative approach to finding equations of motion. Classical mechanics postulates that the path actually followed by a physical system is that for which the action is minimized, or, more generally, is stationary. In other words, the action satisfies a variational principle: the principle of stationary action (see also below). The action is defined by an integral, and the classical equations of motion of a system can be derived by minimizing the value of that integral.
This simple principle provides deep insights into physics, and is an important concept in modern theoretical physics.
The equivalence of these two approaches is contained in Hamilton's principle, which states that the differential equations of motion for any physical system can be reformulated as an equivalent integral equation. It applies not only to the classical mechanics of a single particle, but also to classical fields such as the electromagnetic and gravitational fields. Hamilton's principle has also been extended to quantum mechanics and quantum field theory—in particular path integral formulation makes use of the concept—where a physical system follows simultaneously all possible paths with probability amplitudes for each path being determined by the action for the path.^{[2]}
History
Action was defined in several, now obsolete, ways during the development of the concept.^{[3]}

Gottfried Leibniz, Johann Bernoulli and Pierre Louis Maupertuis defined the action for light as the integral of its speed or inverse speed along its path length.

Leonhard Euler (and, possibly, Leibniz) defined action for a material particle as the integral of the particle's speed along its path through space.

Pierre Louis Maupertuis introduced several ad hoc and contradictory definitions of action within a single article, defining action as potential energy, as virtual kinetic energy, and as a hybrid that ensured conservation of momentum in collisions.^{[4]}
Mathematical definition
Expressed in mathematical language, using the calculus of variations, the evolution of a physical system (i.e., how the system actually progresses from one state to another) corresponds to a stationary point (usually, a minimum) of the action.
Several different definitions of 'the action' are in common use in physics.^{[3]}^{[5]} The action is usually an integral over time. But for action pertaining to fields, it may be integrated over spatial variables as well. In some cases, the action is integrated along the path followed by the physical system.
The action is typically represented as an integral over time, taken along the path of the system between the initial time and the final time of the development of the system,^{[3]}

\mathcal{S} = \int_{t_1}^{t_2} L \, dt\,,
where the integrand L is called the Lagrangian. For the action integral to be welldefined the trajectory has to be bounded in time and space.
Action has the dimensions of [energy]·[time], and its SI unit is joulesecond. Dimensionally, action has the same units as angular momentum.
Action in classical physics (disambiguation)
In classical physics, the term "action" has a number of meanings.
Action (functional)
Most commonly, the term is used for a functional \mathcal{S} which takes a function of time and (for fields) space as input and returns a scalar.^{[6]}^{[7]} In classical mechanics, the input function is the evolution q(t) of the system between two times t_{1} and t_{2}, where q represent the generalized coordinates. The action \mathcal{S}[\mathbf{q}(t)] is defined as the integral of the Lagrangian L for an input evolution between the two times

\mathcal{S}[\mathbf{q}(t)] = \int_{t_1}^{t_2} L[\mathbf{q}(t),\dot{\mathbf{q}}(t),t]\, dt
where the endpoints of the evolution are fixed and defined as \mathbf{q}_{1} = \mathbf{q}(t_{1}) and \mathbf{q}_{2} = \mathbf{q}(t_{2}). According to Hamilton's principle, the true evolution q_{true}(t) is an evolution for which the action \mathcal{S}[\mathbf{q}(t)] is stationary (a minimum, maximum, or a saddle point). This principle results in the equations of motion in Lagrangian mechanics.
Abbreviated action (functional)
Usually denoted as \mathcal{S}_{0}, this is also a functional. Here the input function is the path followed by the physical system without regard to its parameterization by time. For example, the path of a planetary orbit is an ellipse, and the path of a particle in a uniform gravitational field is a parabola; in both cases, the path does not depend on how fast the particle traverses the path. The abbreviated action \mathcal{S}_{0} is defined as the integral of the generalized momenta along a path in the generalized coordinates

\mathcal{S}_{0} = \int \mathbf{p} \cdot d\mathbf{q} = \int p_i \,dq_i
According to Maupertuis' principle, the true path is a path for which the abbreviated action \mathcal{S}_{0} is stationary.
Hamilton's principal function
Hamilton's principal function is defined by the Hamilton–Jacobi equations (HJE), another alternative formulation of classical mechanics. This function S is related to the functional \mathcal{S} by fixing the initial time t_{1} and endpoint q_{1} and allowing the upper limits t_{2} and the second endpoint q_{2} to vary; these variables are the arguments of the function S. In other words, the action function S is the indefinite integral of the Lagrangian with respect to time.
Hamilton's characteristic function
When the total energy E is conserved, the Hamilton–Jacobi equation can be solved with the additive separation of variables

S(q_{1},\dots,q_{N},t)= W(q_{1},\dots,q_{N})  E\cdot t,
where the time independent function W(q_{1}, q_{2} ... q_{N}) is called Hamilton's characteristic function. The physical significance of this function is understood by taking its total time derivative

\frac{d W}{d t}= \frac{\partial W}{\partial q_i}\dot q_i=p_i\dot q_i.
This can be integrated to give

W(q_{1},\dots,q_{N}) = \int p_i\dot q_i \,dt = \int p_i\,dq_i,
which is just the abbreviated action.
Other solutions of Hamilton–Jacobi equations
The Hamilton–Jacobi equations are often solved by additive separability; in some cases, the individual terms of the solution, e.g., S_{k}(q_{k}), are also called an "action".^{[3]}
Action of a generalized coordinate
This is a single variable J_{k} in the actionangle coordinates, defined by integrating a single generalized momentum around a closed path in phase space, corresponding to rotating or oscillating motion

J_{k} = \oint p_{k} dq_{k}
The variable J_{k} is called the "action" of the generalized coordinate q_{k}; the corresponding canonical variable conjugate to J_{k} is its "angle" w_{k}, for reasons described more fully under actionangle coordinates. The integration is only over a single variable q_{k} and, therefore, unlike the integrated dot product in the abbreviated action integral above. The J_{k} variable equals the change in S_{k}(q_{k}) as q_{k} is varied around the closed path. For several physical systems of interest, J_{k} is either a constant or varies very slowly; hence, the variable J_{k} is often used in perturbation calculations and in determining adiabatic invariants.
Action for a Hamiltonian flow
See tautological oneform.
Euler–Lagrange equations for the action integral
As noted above, the requirement that the action integral be stationary under small perturbations of the evolution is equivalent to a set of differential equations (called the Euler–Lagrange equations) that may be determined using the calculus of variations. We illustrate this derivation here using only one coordinate, x; the extension to multiple coordinates is straightforward.^{[1]}^{[7]}
Adopting Hamilton's principle, we assume that the Lagrangian L (the integrand of the action integral) depends only on the coordinate x(t) and its time derivative dx(t)/dt, and may also depend explicitly on time. In that case, the action integral can be written

\mathcal{S} = \int_{t_1}^{t_2}\; L(x,\dot{x},t)\,dt
where the initial and final times (t_{1} and t_{2}) and the final and initial positions are specified in advance as x_{1} = x(t_{1}) and x_{2} = x(t_{2}). Let x_{true}(t) represent the true evolution that we seek, and let x_{\mathrm{per}}(t) be a slightly perturbed version of it, albeit with the same endpoints, x_{\mathrm{per}}(t_{1})=x_{1} and x_{\mathrm{per}}(t_{2})=x_{2}. The difference between these two evolutions, which we will call \varepsilon(t), is infinitesimally small at all times

\varepsilon(t) = x_{\mathrm{per}}(t)  x_{\mathrm{true}}(t)
At the endpoints, the difference vanishes, i.e., \varepsilon(t_{1}) = \varepsilon(t_{2}) = 0.
Expanded to first order, the difference between the actions integrals for the two evolutions is

\begin{align} \delta \mathcal{S} &= \int_{t_1}^{t_2}\; \left[ L(x_{\mathrm{true}}+\varepsilon,\dot x_{\mathrm{true}} +\dot\varepsilon,t) L(x_{\mathrm{true}},\dot x_{\mathrm{true}},t) \right]dt \\ &= \int_{t_1}^{t_2}\; \left(\varepsilon{\partial L\over\partial x} + \dot\varepsilon{\partial L\over\partial \dot x} \right)\,dt \end{align}
Integration by parts of the last term, together with the boundary conditions \varepsilon(t_{1}) = \varepsilon(t_{2}) = 0, yields the equation

\delta \mathcal{S} = \int_{t_1}^{t_2}\; \left( \varepsilon{\partial L\over \partial x}  \varepsilon{d\over dt }{\partial L\over\partial \dot x} \right)\,dt.
The requirement that \mathcal{S} be stationary implies that the firstorder change must be zero for any possible perturbation ε(t) about the true evolution,

This can be true only if

The Euler–Lagrange equation is obeyed provided the functional derivative of the action integral is identically zero:

\frac{\delta \mathcal{S}}{\delta x(t)}=0.
The quantity \frac{\partial L}{\partial\dot x} is called the conjugate momentum for the coordinate x. An important consequence of the Euler–Lagrange equations is that if L does not explicitly contain coordinate x, i.e.

if \frac{\partial L}{\partial x}=0, then \frac{\partial L}{\partial\dot x} is constant in time.
In such cases, the coordinate x is called a cyclic coordinate, and its conjugate momentum is conserved.
Example: free particle in polar coordinates
Simple examples help to appreciate the use of the action principle via the Euler–Lagrangian equations. A free particle (mass m and velocity v) in Euclidean space moves in a straight line. Using the Euler–Lagrange equations, this can be shown in polar coordinates as follows. In the absence of a potential, the Lagrangian is simply equal to the kinetic energy

L = \frac{1}{2} mv^2= \frac{1}{2}m \left( \dot{x}^2 + \dot{y}^2 \right)
in orthonormal (x,y) coordinates, where the dot represents differentiation with respect to the curve parameter (usually the time, t). In polar coordinates (r, φ) the kinetic energy and hence the Lagrangian becomes

L = \frac{1}{2}m \left( \dot{r}^2 + r^2\dot\varphi^2 \right).
The radial r and φ components of the Euler–Lagrangian equations become, respectively

\begin{align} \frac{d}{dt} \left( \frac{\partial L}{\partial \dot{r}} \right)  \frac{\partial L}{\partial r} &= 0 \qquad \Rightarrow \qquad \ddot{r}  r\dot{\varphi}^2 &= 0 \\ \frac{d}{dt} \left( \frac{\partial L}{\partial \dot{\varphi}} \right)  \frac{\partial L}{\partial \varphi} &= 0 \qquad \Rightarrow \qquad \ddot{\varphi} + \frac{2}{r}\dot{r}\dot{\varphi} &= 0 \end{align}
The solution of these two equations is given by

\begin{align} r\cos\varphi &= a t + b \\ r\sin\varphi &= c t + d \end{align}
for a set of constants a, b, c, d determined by initial conditions. Thus, indeed, the solution is a straight line given in polar coordinates.
The action principle
Classical fields
The action principle can be extended to obtain the equations of motion for fields, such as the electromagnetic field or gravitational field.
The Einstein equation utilizes the Einstein–Hilbert action as constrained by a variational principle.
The trajectory (path in spacetime) of a body in a gravitational field can be found using the action principle. For a free falling body, this trajectory is a geodesic.
Conservation laws
Implications of symmetries in a physical situation can be found with the action principle, together with the Euler–Lagrange equations, which are derived from the action principle. An example is Noether's theorem, which states that to every continuous symmetry in a physical situation there corresponds a conservation law (and conversely). This deep connection requires that the action principle be assumed.^{[2]}
Quantum mechanics and quantum field theory
In quantum mechanics, the system does not follow a single path whose action is stationary, but the behavior of the system depends on all permitted paths and the value of their action. The action corresponding to the various paths is used to calculate the path integral, that gives the probability amplitudes of the various outcomes.
Although equivalent in classical mechanics with Newton's laws, the action principle is better suited for generalizations and plays an important role in modern physics. Indeed, this principle is one of the great generalizations in physical science. It is best understood within quantum mechanics. In particular, in Richard Feynman's path integral formulation of quantum mechanics, where it arises out of destructive interference of quantum amplitudes.
Maxwell's equations can also be derived as conditions of stationary action.
Single relativistic particle
When relativistic effects are significant, the action of a point particle of mass m travelling a world line C parametrized by the proper time \tau is

S =  m c^2 \int_{C} \, d \tau .
If instead, the particle is parametrized by the coordinate time t of the particle and the coordinate time ranges from t_{1} to t_{2}, then the action becomes

\int_{t1}^{t2} L \, dt
where the Lagrangian is

L =  m c^2 \sqrt {1  \frac{v^2}{c^2}}.^{[8]}
Modern extensions
The action principle can be generalized still further. For example, the action need not be an integral because nonlocal actions are possible. The configuration space need not even be a functional space given certain features such as noncommutative geometry. However, a physical basis for these mathematical extensions remains to be established experimentally.^{[6]}
See also
References

^ ^{a} ^{b} McGraw Hill Encyclopaedia of Physics (2nd Edition), C.B. Parker, 1994, ISBN 0070514003

^ ^{a} ^{b} Quantum Mechanics, E. Abers, Pearson Ed., Addison Wesley, Prentice Hall Inc, 2004, ISBN 9780131461000

^ ^{a} ^{b} ^{c} ^{d} Analytical Mechanics, L.N. Hand, J.D. Finch, Cambridge University Press, 2008, ISBN 9780521575720

^ Œuvres de Mr de Maupertuis (pre1801 Imprint Collection at the Library of Congress).

^ Encyclopaedia of Physics (2nd Edition), R.G. Lerner, G.L. Trigg, VHC publishers, 1991, ISBN (Verlagsgesellschaft) 3527269541, ISBN (VHC Inc.) 0895737523

^ ^{a} ^{b} The Road to Reality, Roger Penrose, Vintage books, 2007, ISBN 0679776311

^ ^{a} ^{b} Classical Mechanics, T.W.B. Kibble, European Physics Series, McGrawHill (UK), 1973, ISBN 0070840180

^ L.D. Landau and E.M. Lifshitz The Classical Theory of Fields AddisonWesley 1971 sec 8.p.2425
Sources and further reading
For an annotated bibliography, see Edwin F. Taylor [1] who lists, among other things, the following books

The Cambridge Handbook of Physics Formulas, G. Woan, Cambridge University Press, 2010, ISBN 9780521575072.

Cornelius Lanczos, The Variational Principles of Mechanics (Dover Publications, New York, 1986). ISBN 0486650677. The reference most quoted by all those who explore this field.

L. D. Landau and E. M. Lifshitz, Mechanics, Course of Theoretical Physics (ButterworthHeinenann, 1976), 3rd ed., Vol. 1. ISBN 0750628960. Begins with the principle of least action.

Thomas A. Moore "LeastAction Principle" in Macmillan Encyclopedia of Physics (Simon & Schuster Macmillan, 1996), Volume 2, ISBN 0028973593, OCLC 35269891, pages 840 – 842.

Gerald Jay Sussman and Jack Wisdom, Structure and Interpretation of Classical Mechanics (MIT Press, 2001). Begins with the principle of least action, uses modern mathematical notation, and checks the clarity and consistency of procedures by programming them in computer language.

Dare A. Wells, Lagrangian Dynamics, Schaum's Outline Series (McGrawHill, 1967) ISBN 0070692580, A 350 page comprehensive "outline" of the subject.

Robert Weinstock, Calculus of Variations, with Applications to Physics and Engineering (Dover Publications, 1974). ISBN 0486630692. An oldie but goodie, with the formalism carefully defined before use in physics and engineering.

Wolfgang Yourgrau and Stanley Mandelstam, Variational Principles in Dynamics and Quantum Theory (Dover Publications, 1979). A nice treatment that does not avoid the philosophical implications of the theory and lauds the Feynman treatment of quantum mechanics that reduces to the principle of least action in the limit of large mass.

Edwin F. Taylor's page [2]

Principle of least action interactive Excellent interactive explanation/webpage
External links
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