Triangular Subgroups of Sp(d, R) and Reproducing Formulae

Abstract

We consider the (extended) metaplectic representation of the semidirect product G= Hd Sp(d, R) between the Heisenberg group and the symplectic group. Subgroups H= D, with being a d× d symmetric matrix and D a closed subgroup of GL(d, R), are our main concern. We shall give a general setting for the reproducibility of such groups which include and assemble the ones for the single examples treated in [5]. As a byproduct, the extended metaplectic representation restricted to some classes of such subgroups is either the Schr\"odinger representation of R2d or the wavelet representation of Rd D, with D closed subgroup of GL(d, R). Finally, we shall provide new examples of reproducing groups of the type H= D, in dimension d=2.