The Maximum Size of (k,l)-Sum-Free Sets in Cyclic Groups
Abstract
A subset A of a finite abelian group G is called (k,l)-sum-free if the sum of k (not-necessarily-distinct) elements of A never equals the sum of l (not-necessarily-distinct) elements of A. We find an explicit formula for the maximum size of a (k,l)-sum-free subset in G for all k and l in the case when G is cyclic by proving that it suffices to consider (k,l)-sum-free intervals in subgroups of G. This simplifies and extends earlier results by Hamidoune and Plagne and by Bajnok.
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