Laplacian operators and Radon transforms on Grassmann graphs
Abstract
Let be a vector space over a finite field with q elements. Let G denote the general linear group of endomorphisms of and let us consider the left regular representation associated to the natural action of G on the set X of linear subspaces of . In this paper we study a natural basis B of the algebra of intertwining maps on . By using a Laplacian operator on Grassmann graphs, we identify the kernels in B as solutions of a basic hypergeometric difference equation. This provides two expressions for these kernels. One in terms of the q-Hahn polynomials and the other by means of a Rodrigues type formula. Finally, we obtain a useful product formula for the mappings in B. We give two different proofs. One uses the theory of classical hypergeometric polynomials and the other is supported by a characterization of spherical functions in finite symmetric spaces. Both proofs require the use of certain associated Radon transforms.
Cite
@article{arxiv.math/0404019,
title = {Laplacian operators and Radon transforms on Grassmann graphs},
author = {J. M. Marco and J. Parcet},
journal= {arXiv preprint arXiv:math/0404019},
year = {2007}
}
Comments
32 pages