Showing papers by "J. W. P. Hirschfeld published in 1995"
TL;DR: The known results on the maximum size of an arc in a projective space or equivalently the maximum length of a maximum distance separable linear code are surveyed and it is shown that this maximum is q+1 for all dimensions up to q in the cases that q=11 and q=13.
Abstract: The known results on the maximum size of an arc in a projective space or equivalently the maximum length of a maximum distance separable linear code are surveyed. It is then shown that this maximum is q+1 for all dimensions up to q in the cases that q=11 and q=13; the result for q=11 was previously known. The strategy is to first show that a 11-arc in PG (3,11) and a 12-arc in PG (3,13) are subsets of a twisted cubic, that is, a normal rational curve.
21 citations
TL;DR: It is shown how to represent algebraically all functions that have a zero sum on all μ-dimensional subspaces ofPG(n,q) or ofAG(n), so that one can calculate the dimensions of related codes, or represent interesting sets of points by functions.
Abstract: It is shown how to represent algebraically all functions that have a zero sum on all μ-dimensional subspaces ofPG(n,q) or ofAG(n,q). In this way one can calculate the dimensions of related codes, or one can represent interesting sets of points by functions.
16 citations