Explicit Formulas for the Casimir Eigenvalues of SL(n,Z)-Maass Forms

Abstract

Maass forms for SL(n,Z) are defined to be eigenfunctions of the Casimir operators Dm,n of orders 1 ≤ m ≤ n for GL(n,R). For any 1 ≤ m ≤ n and Maass form ϕ for SL(n,Z), we provide a formula for the eigenvalue of Dm,n associated with ϕ in terms of the Langlands parameters of ϕ. In the case m=2, we recover the formula for the Laplace eigenvalue of a Maass form due to Terras, the Casimir differential operator of order 2 being the Laplacian. Our proof takes a graph-theoretic approach, relating the action of every elementary differential operator of order m for GL(n,R) to the partitions of a directed, edge-ordered graph with m edges and at most m vertices.