Husimi, Wigner, T\"oplitz, quantum statistics and anticanonical transformations

Abstract

We study the behaviour of Husimi, Wigner and T\"oplitz symbols of quantum density matrices when quantum statistics are tested on them, that is when on exchange two coordinates in one of the two variables of their integral kernel. We show that to each of these actions is associated a canonical transform on the cotangent bundle of the underlying classical phase space. Equivalently can one associate a complex canonical transform on the complexification of the phase-space. In the off-diagonal T\"oplitz representation introduced in [P], the action considered is associated to a complex aanticanonical relation.

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