s-almost cross-t-intersecting families for vector spaces
Abstract
Let V be an n-dimensional vector space over the finite field F q , and V k denote the family of all k-dimensional subspaces of V. The families F,G⊂eq V k are said to be cross-t-intersecting if (F G) t for all F∈ F, G∈ G. Two families F and G are called s-almost cross-t-intersecting if each member of F (resp. G) is t-disjoint with at most s members of G (resp. F). In this paper, we discribe the structure of s-almost cross-t-intersecting families with maximum product of their sizes. In addition, we prove a stability result.
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