The wreath matrix

Abstract

Let k≤ n be positive integers and Zn be the set of integers modulo n. A conjecture of Baranyai from 1974 asks for a decomposition of k-element subsets of Zn into particular families of sets called "wreaths". We approach this conjecture from a new algebraic angle by introducing the key object of this paper, the wreath matrix M. As our first result, we establish that Baranyai's conjecture is equivalent to the existence of a particular vector in the kernel of M. We then employ results from representation theory to study M and its spectrum in detail. In particular, we find all eigenvalues of M and their multiplicities, and identify several families of vectors which lie in the kernel of M.