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Main Authors: Abhinav, Kumar, Führ, Hartmut, Jahan, Qaiser
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2508.07242
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author Abhinav, Kumar
Führ, Hartmut
Jahan, Qaiser
author_facet Abhinav, Kumar
Führ, Hartmut
Jahan, Qaiser
contents This paper studies wavelet coorbit spaces on disconnected local fields $K$, associated to the quasi-regular representation of $G = K \rtimes K^*$ acting on $L^2(K)$. We show that coorbit space theory applies in this context, and identify the homogeneous Besov spaces $\dot{B}_{α,s,t}(K)$ as coorbit spaces. We identify a particularly convenient space $\mathcal{S}_0(K)$ of wavelets that give rise to tight wavelet frames via the action of suitable, easily determined discrete subsets $R \subset G$, and show that the resulting wavelet expansions converge simultaneously in the whole range of coorbit spaces. For orthonormal wavelet bases constructed from elements of $\mathcal{S}_0(K)$, the associated wavelet bases turn out to be unconditional bases for all coorbit spaces. We give explicit constructions of tight wavelet frames and wavelet orthonormal bases to which our results apply.
format Preprint
id arxiv_https___arxiv_org_abs_2508_07242
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Wavelet Coorbit Spaces over Local Fields
Abhinav, Kumar
Führ, Hartmut
Jahan, Qaiser
Functional Analysis
This paper studies wavelet coorbit spaces on disconnected local fields $K$, associated to the quasi-regular representation of $G = K \rtimes K^*$ acting on $L^2(K)$. We show that coorbit space theory applies in this context, and identify the homogeneous Besov spaces $\dot{B}_{α,s,t}(K)$ as coorbit spaces. We identify a particularly convenient space $\mathcal{S}_0(K)$ of wavelets that give rise to tight wavelet frames via the action of suitable, easily determined discrete subsets $R \subset G$, and show that the resulting wavelet expansions converge simultaneously in the whole range of coorbit spaces. For orthonormal wavelet bases constructed from elements of $\mathcal{S}_0(K)$, the associated wavelet bases turn out to be unconditional bases for all coorbit spaces. We give explicit constructions of tight wavelet frames and wavelet orthonormal bases to which our results apply.
title Wavelet Coorbit Spaces over Local Fields
topic Functional Analysis
url https://arxiv.org/abs/2508.07242