Schwinger variational principle is a

variational principle A variational principle is a mathematical procedure that renders a physical problem solvable by the calculus of variations, which concerns finding functions that optimize the values of quantities that depend on those functions. For example, the pr ...

which expresses the scattering T-matrix as a

functional Functional may refer to: * Movements in architecture: ** Functionalism (architecture) ** Form follows function * Functional group, combination of atoms within molecules * Medical conditions without currently visible organic basis: ** Functional s ...

depending on two unknown

wave functions In quantum physics, a wave function (or wavefunction) is a mathematical description of the quantum state of an isolated quantum system. The most common symbols for a wave function are the Greek letters and (lower-case and capital psi, respec ...

. The functional attains stationary value equal to actual scattering T-matrix. The functional is stationary

if and only if In logic and related fields such as mathematics and philosophy, "if and only if" (often shortened as "iff") is paraphrased by the biconditional, a logical connective between statements. The biconditional is true in two cases, where either bo ...

the two functions satisfy the Lippmann-Schwinger equation. The development of the variational formulation of the scattering theory can be traced to works of

L. Hultén Carl Linnaeus (23 May 1707 – 10 January 1778), also known after ennoblement in 1761 as Carl von Linné,#Blunt, Blunt (2004), p. 171. was a Swedish biologist and physician who formalised binomial nomenclature, the modern system of naming o ...

and J. Schwinger in 1940s.R.G. Newton, Scattering Theory of Waves and Particles

Linear form of the functional

The T-matrix expressed in the form of stationary value of the functional reads :

\equiv \langle\psi', V, \phi\rangle + \langle\phi', V, \psi\rangle - \langle\psi', V-VG_0^(E)V, \psi\rangle ,

where

\phi

and

\phi'

are the initial and the final states respectively,

V

is the interaction potential and

G_0^(E)

is the retarded Green's operator for collision energy

E

. The condition for the stationary value of the functional is that the functions

\psi

and

\psi'

satisfy the Lippmann-Schwinger equation :

, \psi\rangle = , \phi\rangle + G_0^(E)V, \psi\rangle

and :

, \psi'\rangle = , \phi'\rangle + G_0^(E)V, \psi'\rangle .

Fractional form of the functional

Different form of the stationary principle for T-matrix reads :

\equiv \frac.

The wave functions

\psi

and

\psi'

must satisfy the same Lippmann-Schwinger equations to get the stationary value.

Application of the principle

The principle may be used for the calculation of the

scattering amplitude In quantum physics, the scattering amplitude is the probability amplitude of the outgoing spherical wave relative to the incoming plane wave in a stationary-state scattering process. Formulation Scattering in quantum mechanics begins with a p ...

in the similar way like the variational principle for bound states, i.e. the form of the wave functions

\psi, \psi'

is guessed, with some free parameters, that are determined from the condition of stationarity of the functional.

References

Bibliography

* * * * * Scattering {{scattering-stub

Linear form of the functional

Fractional form of the functional

Application of the principle

See also

References

Bibliography