Harmonic Analysis on the Affine Group of the Plane
Abstract: For any natural number $n$, the group $G_n$ of all invertible affine transformations of $n$-dimensional Euclidean space has, up to equivalence, just one square-integrable representation and the left regular representation of $G_n$ is a multiple of this square-integrable representation. We provide a concrete realization $\sigma_2$ of this square-integrable representation of $G_2$ acting on the Hilbert space $L2\big(\widehat{\mathbb{R}2}\times\widehat{\mathbb{R}}\big)$. We explicitly decompose the Hilbert space $L2(G_2)$ as a direct sum of left invariant closed subspaces on each of which the left regular representation acts as a representation equivalent to $\sigma_2$.
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