Zak Transform for Semidirect Product of Locally Compact Groups

Abstract

Let H be a locally compact group and K be an LCA group also let τ:H Aut(K) be a continuous homomorphism and Gτ=Hτ K be the semidirect product of H and K with respect to τ. In this article we define the Zak transform ZL on L2(Gτ) with respect to a τ-invariant uniform lattice L of K and we also show that the Zak transform satisfies the Plancherel formula. As an application we show that how these techniques apply for the semidirect product group SL(2,Z)τR2 and also the Weyl-Heisenberg groups.