Linear independence of translates implies linear independence of affine Parseval frames on LCA groups

Abstract

Motivated by Bownik and Speegle's result on linear independence of wavelet Parseval frames, we consider affine systems (analogous to wavelet systems) defined on a second countable, locally compact abelian group G, where the translations are replaced by the action of a countable, discrete subgroup of G acting as a group of unitary operators on L2(G). The dilation operation in the wavelet setting is replaced by integer powers of a unitary operator δ onto L2(G). We show that, under some compatibility conditions between δ and the action of the group , the linear independence of the translates of any function in L2(G) by elements of implies the linear independence of affine Parseval frames in L2(G).