Small weight codewords of projective geometric codes II

Abstract

The p-ary linear code Ck(n,q) is defined as the row space of the incidence matrix A of k-spaces and points of PG(n,q). It is known that if q is square, a codeword of weight qkq+ O ( qk-1 ) exists that cannot be written as a linear combination of at most q rows of A. Over the past few decades, researchers have put a lot of effort towards proving that any codeword of smaller weight does meet this property. We show that if q ≥slant 32 is a composite prime power, every codeword of Ck(n,q) up to weight O ( qkq ) is a linear combination of at most q rows of A. We also generalise this result to the codes Cj,k(n,q) , which are defined as the p-ary row span of the incidence matrix of k-spaces and j-spaces, j < k.