A Hamiltonian system is a

dynamical system In mathematics, a dynamical system is a system in which a Function (mathematics), function describes the time dependence of a Point (geometry), point in an ambient space. Examples include the mathematical models that describe the swinging of a ...

governed by

Hamilton's equations Hamiltonian mechanics emerged in 1833 as a reformulation of Lagrangian mechanics. Introduced by Sir William Rowan Hamilton, Hamiltonian mechanics replaces (generalized) velocities \dot q^i used in Lagrangian mechanics with (generalized) ''momenta ...

. In

physics Physics is the natural science that studies matter, its fundamental constituents, its motion and behavior through space and time, and the related entities of energy and force. "Physical science is that department of knowledge which r ...

, this dynamical system describes the evolution of a

physical system A physical system is a collection of physical objects. In physics, it is a portion of the physical universe chosen for analysis. Everything outside the system is known as the environment. The environment is ignored except for its effects on the ...

such as a

planetary system A planetary system is a set of gravitationally In physics, gravity () is a fundamental interaction which causes mutual attraction between all things with mass or energy. Gravity is, by far, the weakest of the four fundamental interacti ...

or an

electron The electron ( or ) is a subatomic particle with a negative one elementary electric charge. Electrons belong to the first generation of the lepton particle family, and are generally thought to be elementary particles because they have no kn ...

in an

electromagnetic field An electromagnetic field (also EM field or EMF) is a classical (i.e. non-quantum) field produced by (stationary or moving) electric charges. It is the field described by classical electrodynamics (a classical field theory) and is the classical c ...

. These systems can be studied in both

Hamiltonian mechanics Hamiltonian mechanics emerged in 1833 as a reformulation of Lagrangian mechanics. Introduced by Sir William Rowan Hamilton, Hamiltonian mechanics replaces (generalized) velocities \dot q^i used in Lagrangian mechanics with (generalized) ''momenta ...

and

dynamical systems theory Dynamical systems theory is an area of mathematics used to describe the behavior of complex dynamical systems, usually by employing differential equations or difference equations. When differential equations are employed, the theory is called '' ...

Overview

Informally, a Hamiltonian system is a mathematical formalism developed by

Hamilton Hamilton may refer to: People * Hamilton (name), a common British surname and occasional given name, usually of Scottish origin, including a list of persons with the surname ** The Duke of Hamilton, the premier peer of Scotland ** Lord Hamilt ...

to describe the evolution equations of a physical system. The advantage of this description is that it gives important insights into the dynamics, even if the

initial value problem In multivariable calculus, an initial value problem (IVP) is an ordinary differential equation together with an initial condition which specifies the value of the unknown function at a given point in the domain. Modeling a system in physics or ...

cannot be solved analytically. One example is the planetary movement of three bodies: while there is no

closed-form solution In mathematics, a closed-form expression is a mathematical expression that uses a finite number of standard operations. It may contain constants, variables, certain well-known operations (e.g., + − × ÷), and functions (e.g., ''n''th roo ...

to the general problem, Poincaré showed for the first time that it exhibits

deterministic chaos Chaos theory is an interdisciplinary area of scientific study and branch of mathematics focused on underlying patterns and deterministic laws of dynamical systems that are highly sensitive to initial conditions, and were once thought to have ...

. Formally, a Hamiltonian system is a dynamical system characterised by the scalar function

H(\boldsymbol,\boldsymbol,t)

, also known as the Hamiltonian. The state of the system,

\boldsymbol

, is described by the

generalized coordinates In analytical mechanics, generalized coordinates are a set of parameters used to represent the state of a system in a configuration space. These parameters must uniquely define the configuration of the system relative to a reference state.,p. 39 ...

\boldsymbol

and

\boldsymbol

, corresponding to generalized momentum and position respectively. Both

\boldsymbol

and

\boldsymbol

are real-valued vectors with the same dimension ''N''. Thus, the state is completely described by the 2''N''-dimensional vector :

\boldsymbol = (\boldsymbol,\boldsymbol)

and the evolution equations are given by

: :

& \frac = +\frac. \end

The trajectory

\boldsymbol(t)

is the solution of the

defined by Hamilton's equations and the initial condition

\boldsymbol(t = 0) = \boldsymbol_0\in\mathbb^

Time-independent Hamiltonian systems

If the Hamiltonian is not explicitly time-dependent, i.e. if

H(\boldsymbol,\boldsymbol,t) = H(\boldsymbol,\boldsymbol)

, then the Hamiltonian does not vary with time at all: and thus the Hamiltonian is a constant of motion, whose constant equals the total

energy In physics, energy (from Ancient Greek: ἐνέργεια, ''enérgeia'', “activity”) is the quantitative property that is transferred to a body or to a physical system, recognizable in the performance of work and in the form of heat a ...

of the system:

H = E

. Examples of such systems are the undamped pendulum, the harmonic oscillator, and

dynamical billiards A dynamical billiard is a dynamical system in which a particle alternates between free motion (typically as a straight line) and specular reflections from a boundary. When the particle hits the boundary it reflects from it without loss of speed ...

Example

An example of a time-independent Hamiltonian system is the harmonic oscillator. Consider the system defined by the coordinates

\boldsymbol = m\dot

and

\boldsymbol = x

. Then the Hamiltonian is given by :

H = \frac + \frac.

The Hamiltonian of this system does not depend on time and thus the energy of the system is conserved.

Symplectic structure

One important property of a Hamiltonian dynamical system is that it has a

symplectic structure Symplectic geometry is a branch of differential geometry and differential topology that studies symplectic manifolds; that is, differentiable manifolds equipped with a closed, nondegenerate 2-form. Symplectic geometry has its origins in the Ha ...

. Writing :

\nabla_ H(\boldsymbol) = \begin
\frac \\
\frac \\
\end

the evolution equation of the dynamical system can be written as :

\frac = M_N \nabla_ H(\boldsymbol)

where :

M_N =
\begin
0 & I_N \\
-I_N & 0 \\
\end

and ''I''_''N'' is the ''N''×''N''

identity matrix In linear algebra, the identity matrix of size n is the n\times n square matrix with ones on the main diagonal and zeros elsewhere. Terminology and notation The identity matrix is often denoted by I_n, or simply by I if the size is immaterial o ...

. One important consequence of this property is that an infinitesimal phase-space volume is preserved. A corollary of this is Liouville's theorem, which states that on a Hamiltonian system, the phase-space volume of a closed surface is preserved under time evolution. :

\begin
\frac\oint_ d\boldsymbol &= \oint_\frac\cdot d\hat_ \\
&= \oint_ \left(M_N \nabla_ H(\boldsymbol)\right) \cdot d\hat_ \\
&= \int_\nabla_\cdot \left(M_N \nabla_ H(\boldsymbol)\right) \, dV \\
&= \int_\sum_^N\sum_^N\left(\frac - \frac\right) \, dV \\
&= 0 
\end

where the third equality comes from the

divergence theorem In vector calculus, the divergence theorem, also known as Gauss's theorem or Ostrogradsky's theorem, reprinted in is a theorem which relates the ''flux'' of a vector field through a closed surface to the ''divergence'' of the field in the vol ...

Examples

Dynamical billiards A dynamical billiard is a dynamical system in which a particle alternates between free motion (typically as a straight line) and specular reflections from a boundary. When the particle hits the boundary it reflects from it without loss of speed ...

Planetary system A planetary system is a set of gravitationally In physics, gravity () is a fundamental interaction which causes mutual attraction between all things with mass or energy. Gravity is, by far, the weakest of the four fundamental interacti ...

s, more specifically, the

n-body problem In physics, the -body problem is the problem of predicting the individual motions of a group of celestial objects interacting with each other gravitationally.Leimanis and Minorsky: Our interest is with Leimanis, who first discusses some histor ...

. *

Canonical general relativity In physics, canonical quantum gravity is an attempt to quantize the canonical formulation of general relativity (or canonical gravity). It is a Hamiltonian formulation of Einstein's general theory of relativity. The basic theory was outlined by ...

References

External links

* {{DEFAULTSORT:Hamiltonian System Hamiltonian mechanics