After having expressed the partition function of a general hamiltonian system in path-integral form, we introduce a variational method in order to derive an effective hamiltonian function. The latter can be introduced in a classical like phase-space integral, which gives an approximation of the partition function and yields the exact quantum result in the case of quadratic systems. The method starts from the Feynman-Jensen inequality, whose validity in the most general case is, until now, not well established. Application is made to the one-dimensional Double Sine-Gordon field.
An effective hamiltonian for quantum statistical mechanics
1989
Abstract
After having expressed the partition function of a general hamiltonian system in path-integral form, we introduce a variational method in order to derive an effective hamiltonian function. The latter can be introduced in a classical like phase-space integral, which gives an approximation of the partition function and yields the exact quantum result in the case of quadratic systems. The method starts from the Feynman-Jensen inequality, whose validity in the most general case is, until now, not well established. Application is made to the one-dimensional Double Sine-Gordon field.File in questo prodotto:
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