The Schwartz correspondence for the complex motion group on ${\mathbb C}^2$

TL;DR

This paper investigates the Schwartz correspondence property for the complex motion group, extending the understanding of harmonic analysis on Gelfand pairs with non-abelian compact groups and non-nilpotent groups.

Contribution

It establishes the Schwartz correspondence for the complex motion group with $K=U_2$, a case not previously analyzed, broadening the class of Gelfand pairs where this property holds.

Findings

Schwartz correspondence holds for the complex motion group with $K=U_2$.

Extends known results to non-abelian compact groups and non-nilpotent groups.

Provides new insights into harmonic analysis on complex motion groups.

Abstract

If $(G,K)$ is a Gelfand pair, with $G$ a Lie group of polynomial growth and $K$ a compact subgroup of $G$, the Gelfand spectrum $\Sigma$ of the bi-$K$-invariant algebra $L^1(K\backslash G/K)$ admits natural embeddings into ${\mathbb R}^n$ spaces as a closed subset. For any such embedding, define ${\mathcal S}(\Sigma)$ as the space of restrictions to $\Sigma$ of Schwartz functions on ${\mathbb R}^n$. We call Schwartz correspondence for $(G,K)$ the property that the spherical transform is an isomorphism of ${\mathcal S}(K\backslash G/K)$ onto ${\mathcal S}(\Sigma)$. In all the cases studied so far, Schwartz correspondence has been proved to hold true. These include all pairs with $G=K\ltimes H$ and $K$ abelian and a large number of pairs with $G=K\ltimes H$ and $H$ nilpotent. In this paper we study what is probably the simplest of the pairs with $G=K\ltimes H$, $K$ non-abelian and $H$ non-nilpotent, with $H=M_2({\mathbb C})$, the complex motion group, and $K=U_2$ acting on it by inner automorphisms.