Abstract noncommutative Fourier series on $\Gamma \setminus SE(2)$

Arash Ghaani Farashahi (Department of Mechanical Engineering, National University of Singapore; and Department of Pure Mathematics, School of Mathematics, University of Leeds, United Kingdom)

Gregory Chirikjian (Department of Mechanical Engineering, National University of Singapore)

Abstract

This paper begins with a systematic study of abstract noncommutative Fourier series on $\Gamma \setminus SE(2)$, where $\Gamma$ is a discrete co-compact subgroup of $SE(2)$, the group of all handedness-preserving isometries of the Euclidean plane. Let $\mu$ be the finite $SE(2)$-invariant measure on the right coset space $\Gamma \setminus SE(2)$, normalized with respect to Weil’s formula. The analytic aspects of the proposed method works for any given (discrete) basis of the Hilbert function space $L^2 (\Gamma \setminus SE(2), \mu)$. The paper concludes with some convolution results.

Keywords

special Euclidean group, non-commutative Fourier series, coset space, discrete subgroup, crystallographic subgroup

2010 Mathematics Subject Classification

Primary 43A10, 43A15, 43A20, 43A30, 43A85. Secondary 20H15, 68T40, 74E15, 82D25.

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Received 15 June 2020

Accepted 16 November 2020

Published 10 February 2022