New upper bounds for the size of set systems with restricted intersections modulo prime powers
Abstract
Let q=pα be a fixed prime power, k≥ 2 be an integer. We give a new upper bound for the size of k-wise q-modular L-avoiding L-intersecting set systems, where L is any proper subset of \0, … , q-1\. Our proof is based on the linear algebra bound method and basic number theory.
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