Jae-Hyun Yang
Published 2006-12-13, updated 2006-12-14Version 2
In this article, we prove that a lattice representation of the Heisenberg group $H_{\mathbb R}^{(g,h)}$ associated to a lattice $L$ and a positive definite symmetric half-integral matrix M of degree $h$ is unitarily equivalent to the direct sum of $(det 2M)^g$ copies of the Schroedinger representation of $H_{\mathbb R}^{(g,h)}$.
Comments: 16 pages, change of page height
Journal: Math. Ann. 317 (2000), pp. 309-323
Visible actions and criteria for multiplicity-freeness of representations of Heisenberg groups
HRT Conjecture and Linear Independence of Translates on the Heisenberg Group
Symbolic calculus and convolution semigroups of measures on the Heisenberg group
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