Linear Dependency of Translations and Square Integrable Representations
Abstract
Let G be a locally compact group. We examine the problem of determining when nonzero functions in L2(G) have linearly independent translations. In particular, we establish some results for the case when G has an irreducible, square integrable, unitary representation. We apply these results to the special cases of the affine group, the shearlet group and the Weyl-Heisenberg group. We also investigate the case when G has an abelian, closed subgroup of finite index.
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