Minimal codewords arising from the incidence of points and hyperplanes in projective spaces

Abstract

Over the past few years, the codes Cn-1(n,q) arising from the incidence of points and hyperplanes in the projective space PG(n,q) attracted a lot of attention. In particular, small weight codewords of Cn-1(n,q) are a topic of investigation. The main result of this work states that, if q is large enough and not prime, a codeword having weight smaller than roughly 12n-2qn-1q can be written as a linear combination of a few hyperplanes. Consequently, we use this result to provide a graph-theoretical sufficient condition for these codewords of small weight to be minimal.