Avoiding Brooms, Forks, and Butterflies in the Linear Lattices

Abstract

Let n be a positive integer, q a power of a prime, and Ln(q) the poset of subspaces of an n-dimensional vector space over a field with q elements. This poset is a normalized matching poset and the set of subspaces of dimension n/2 or those of dimension n/2 are the only maximum-sized anti-chains in this poset. Strengthening this well-known and celebrated result, we show that, except in the case of L3(2), these same collections of subspaces are the only maximum-sized families in Ln(q) that avoid both a and a as a subposet. We generalize some of the results to brooms and forks, and we also show that the union of the set of subspaces of dimension k and k+1, for k = n/2 or k = n/2 -1, are the only maximum-sized families in Ln(q) that avoid a butterfly (definitions below).