Sh-sets and linear codes over Fq

Abstract

Let (G,+) be an Abelian group. Given h∈ Z+, a non-empty subset A of G is called an Sh-set if all the sums of h distinct elements of A are different. We extend the concept of Sh-set to a more general context in the context of finite vectorial spaces over finite fields. More precisely, a ≠ A⊂eq Fqr is called an Sh-linear set if all the linear combinations of h elements of A are different. We establish a correspondence between q-ary linear codes and Sh-linear sets. This connection allow us to find lower bounds for the maximum size of Sh-sets in Fqr.

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