Sandpile groups of generalized de Bruijn and Kautz graphs and circulant matrices over finite fields

Abstract

A maximal minor M of the Laplacian of an n-vertex Eulerian digraph gives rise to a finite group Zn-1/Zn-1M known as the sandpile (or critical) group S() of . We determine S() of the generalized de Bruijn graphs =DB(n,d) with vertices 0,…,n-1 and arcs (i,di+k) for 0≤ i≤ n-1 and 0≤ k≤ d-1, and closely related generalized Kautz graphs, extending and completing earlier results for the classical de Bruijn and Kautz graphs. Moreover, for a prime p and an n-cycle permutation matrix X∈GLn(p) we show that S(DB(n,p)) is isomorphic to the quotient by X of the centralizer of X in PGLn(p). This offers an explanation for the coincidence of numerical data in sequences A027362 and A003473 of the OEIS, and allows one to speculate upon a possibility to construct normal bases in the finite field Fpn from spanning trees in DB(n,p).