Knit product of finite groups and sampling

Abstract

A finite sampling theory associated with a unitary representation of a finite non Abelian group G on a Hilbert space is stablished. The non Abelian group G is a knit product N H of two finite subgroups N and H. Sampling formulas where the samples are indexed by either N or H are obtained. Using suitable expressions for the involved samples, the problem is reduced to obtain dual frames in the Hilbert space 2(G) having a unitary invariance property; this is done by using matrix analysis techniques. An example involving dihedral groups illustrates the obtained sampling results.