A new family of maximum linear symmetric rank-distance codes
Abstract
Let Sn(q) denote the set of symmetric bilinear forms over an n-dimensional Fq-vector space. A subset C of Sn(q) is called a d-code if the rank of A-B is larger than or equal to d for any distinct A and B in C. If C is further closed under matrix addition, then |C| is sharply upper bounded by qn(n-d+2)/2 if n-d is even and q(n+1)(n-d+1)/2 if n-d is odd. Additive codes meeting these upper bounds are called maximum. There are very few known constructions of them. In this paper, we obtain a new family of maximum Fq-linear (n-2)-codes in Sn(q) for n=6,8 and 10 which are not equivalent to any known constructions. Furthermore, we completely determine the equivalence between distinct members in this new family.
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