Generalized Hamming weights of additive codes and geometric counterparts
Abstract
We consider the geometric problem of determining the maximum number nq(r,h,f;s) of (h-1)-spaces in the projective space PG(r-1,q) such that each subspace of codimension f does contain at most s elements. In coding theory terms we are dealing with additive codes that have a large fth generalized Hamming weight. We also consider the dual problem of the minimum number bq(r,h,f;s) of (h-1)-spaces in PG(r-1,q) such that each subspace of codimension f contains at least s elements. We fully determine b2(5,2,2;s) as a function of s. We additionally give bounds and constructions for other parameters. For the computational results we partially use extensive integer linear programming computations.
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