English

Frames arising from irreducible solvable actions Part I

Functional Analysis 2017-01-10 v3

Abstract

Let GG be a simply connected, connected completely solvable Lie group with Lie algebra g=p+m.\mathfrak{g}=\mathfrak{p}+\mathfrak{m}. Next, let π\pi be an infinite-dimensional unitary irreducible representation of GG obtained by inducing a character from a closed normal subgroup P=exppP=\exp\mathfrak{p} of G.G. Additionally, we assume that G=PM,G=P\rtimes M, M=expmM=\exp\mathfrak{m} is a closed subgroup of G,G, dμMd\mu_{M} is a fixed Haar measure on the solvable Lie group MM and there exists a linear functional λp\lambda\in\mathfrak{p}^{\ast} such that the representation π=πλ=indPG(χλ)\pi=\pi_{\lambda}=\mathrm{ind}_{P}^{G}\left( \chi_{\lambda}\right) is realized as acting in L2(M,dμM).L^{2}\left( M,d\mu_{M}\right) . Making no assumption on the integrability of πλ\pi_{\lambda}, we describe explicitly a discrete subgroup ΓG\Gamma\subset G and a vector fL2(M,dμM)\mathbf{f}\in L^{2}\left( M,d\mu_{M}\right) such that πλ(Γ)f\pi_{\lambda }\left( \Gamma\right) \mathbf{f} is a tight frame for L2(M,dμM).L^{2}\left( M,d\mu_{M}\right) . We also construct compactly supported smooth functions s\mathbf{s} and discrete subsets ΓG\Gamma\subset G such that πλ(Γ)s\pi_{\lambda }\left( \Gamma\right) \mathbf{s} is a frame for L2(M,dμM).L^{2}\left( M,d\mu_{M}\right) .

Keywords

Cite

@article{arxiv.1612.06005,
  title  = {Frames arising from irreducible solvable actions Part I},
  author = {Vignon Oussa},
  journal= {arXiv preprint arXiv:1612.06005},
  year   = {2017}
}
R2 v1 2026-06-22T17:27:37.806Z