A pseudo-differential calculus on non-standard symplectic space; spectral and regularity results in modulation spaces

Abstract

The usual Weyl calculus is intimately associated with the choice of the standard symplectic structure on Rnn. In this paper we will show that the replacement of this structure by an arbitrary symplectic structure leads to a pseudo-differential calculus of operators acting on functions or distributions defined, not on Rn but rather on Rnn. These operators are intertwined with the standard Weyl pseudo-differential operators using an infinite family of partial isometries of L2(Rn) L2(R2n) \ indexed by S(Rn). This allows us obtain spectral and regularity results for our operators using Shubin's symbol classes and Feichtinger's modulation spaces.