On projective qr-divisible codes
Abstract
A projective linear code over Fq is called -divisible if all weights of its codewords are divisible by . Especially, qr-divisible projective linear codes, where r is some integer, arise in many applications of collections of subspaces in Fqv. One example are upper bounds on the cardinality of partial spreads. Here we survey the known results on the possible lengths of projective qr-divisible linear codes.
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