Erdos-Ko-Rado theorem for vector spaces over residue class rings

Abstract

Let h=Πi=1tpisi be its decomposition into a product of powers of distinct primes, and Zh be the residue class ring modulo h. Let Zhn be the n-dimensional row vector space over Zh. A generalized Grassmann graph for Zhn, denoted by Gr(m,n,Zh) (Gr for short), has all m-subspaces of Zhn as its vertices, and two distinct vertices are adjacent if their intersection is of dimension >m-r, where 2≤ r≤ m+1≤ n. In this paper, we determine the clique number and geometric structures of maximum cliques of Gr. As a result, we obtain the Erdos-Ko-Rado theorem for Zhn.