Invariant Differential Operators on Siegel-Jacobi Space

Abstract: For two positive integers $m$ and $n$, we let ${\mathbb H}n$ be the Siegel upper half plane of degree $n$ and let ${\mathbb C}^{(m,n)}$ be the set of all $m\times n$ complex matrices. In this article, we study differential operators on the Siegel-Jacobi space ${\mathbb H}_n\times {\mathbb C}^{(m,n)}$ that are invariant under the natural action of the Jacobi group $Sp(n,{\mathbb R}\ltimes H{\mathbb R}^{(n,m)}$ on ${\mathbb H}n\times {\mathbb C}^{(m,n)}$, where $H{\mathbb R}^{(n,m)}$ denotes the Heisenberg group. We give some explicit invariant differential operators. We present important problems which are natural. We give some partial solutions for these natural problems.