English

Decompositions of Generalized Wavelet Representations

Representation Theory 2014-02-06 v2

Abstract

Let NN be a simply connected, connected nilpotent Lie group which admits a uniform subgroup Γ.\Gamma. Let α\alpha be an automorphism of NN defined by α(expX)=expAX.\alpha\left( \exp X\right) =\exp AX. We assume that the linear action of AA is diagonalizable and we do not assume that NN is commutative. Let WW be a unitary wavelet representation of the semi-direct product group jZαj(Γ)α\left\langle \cup_{j\in\mathbb{Z}}\alpha^{j}\left( \Gamma\right) \right\rangle \rtimes\left\langle \alpha\right\rangle defined by W(γ,1)=f(γ1x)W\left( \gamma,1\right) =f\left( \gamma^{-1}x\right) and W(1,α)=detA1/2f(αx).W\left( 1,\alpha\right) =\left\vert \det A\right\vert ^{1/2}f\left( \alpha x\right) . We obtain a decomposition of WW into a direct integral of unitary representations. Moreover, we provide an explicit unitary operator intertwining the representations, a precise description of the representations occurring, the measure used in the direct integral decomposition and the support of the measure. We also study the irreducibility of the fiber representations occurring in the direct integral decomposition in various settings. We prove that in the case where AA is an expansive automorphism then the decomposition of WW is in fact a direct integral of unitary irreducible representations each occurring with infinite multiplicities if and only if NN is non-commutative. This work naturally extends results obtained by H. Lim, J. Packer and K. Taylor who obtained a direct integral decomposition of WW in the case where NN is commutative and the matrix AA is expansive, i.e. all eigenvalues have absolute values larger than one.

Keywords

Cite

@article{arxiv.1401.2201,
  title  = {Decompositions of Generalized Wavelet Representations},
  author = {B. Currey and A. Mayeli and V. Oussa},
  journal= {arXiv preprint arXiv:1401.2201},
  year   = {2014}
}
R2 v1 2026-06-22T02:42:34.024Z