The Segal-Bargmann Transform on Classical Matrix Lie Groups

TL;DR

This paper analyzes the complex-time Segal-Bargmann transform on classical matrix Lie groups, extending previous work on the unitary group, and explores its asymptotic behavior as the matrix size grows large.

Contribution

It introduces a method to compute the transform on trace polynomials and establishes a meaningful large-N limit for classical matrix Lie groups.

Findings

Effective computation of the transform on trace polynomials.

Existence of a large-N limit operator on Laurent polynomials.

Extension of previous results from the unitary group to other classical groups.

Abstract

We study the complex-time Segal-Bargmann transform $\mathbf{B}_{s,\tau}^{K_N}$ on a compact type Lie group $K_N$, where $K_N$ is one of the following classical matrix Lie groups: the special orthogonal group $\mathrm{SO}(N,\mathbb{R})$, the special unitary group $\mathrm{SU}(N)$, or the compact symplectic group $\mathrm{Sp}(N)$. Our work complements and extends the results of Driver, Hall, and Kemp on the Segal-Bargman transform for the unitary group $\mathrm{U}(N)$. We provide an effective method of computing the action of the Segal-Bargmann transform on \emph{trace polynomials}, which comprise a subspace of smooth functions on $K_N$ extending the polynomial functional calculus. Using these results, we show that as $N\to\infty$, the finite-dimensional transform $\mathbf{B}_{s,\tau}^{K_N}$ has a meaningful limit $\mathscr{G}_{s,\tau}^{(\beta)}$ (where $\beta$ is a parameter associated with $\mathrm{SO}(N,\mathbb{R})$, $\mathrm{SU}(N)$, or $\mathrm{Sp}(N)$), which can be identified as an operator on the space of complex Laurent polynomials.