Non-Abelian Fourier Series on Z2 SE(2)

Abstract

This paper discusses computational structure of coefficients of non-Abelian Fourier series on the right coset space Z2 SE(2) expressed in the trigonometric basis, where SE(2) is the group of handedness preserving Euclidean isometries of the plane and Z2 denotes the discrete subgroup of translations of the orthogonal (square) lattice in R2. Assume that μ is the finite SE(2)-invariant measure on the right coset space Z2 SE(2), normalized with respect to Weil's formula. We present a constructive computational characterization including discrete sampling of non-Abelian Fourier matrix elements on SE(2) for coefficients of μ-square integrable functions on Z2 SE(2) with respect to the concrete trigonometric basis. The paper is concluded with discussion of the method for non-Abelian Fourier coefficients of convolutions on Z2 SE(2).