On the distance distributions of single-orbit cyclic subspace codes
Abstract
A cyclic subspace code is a union of the orbits of subspaces contained in it. In a recent paper, Gluesing-Luerssen et al. (Des. Codes Cryptogr. 89, 447-470, 2021) showed that the study of the distance distribution of a single orbit cyclic subspace code is equivalent to the study of its intersection distribution. In this paper we have proved that in the orbit of a subspace U of Fqn that has the stabilizer Fqt*(t ≠ n), the number of codeword pairs (U,α U) such that (U α U)=i for any i,~ 0≤ i < (U), is a multiple of qt(qt+1), if nt is an odd number. In the case of even nt, if U contains q2tm-1q2t-1~ (m≥ 0) distinct cyclic shifts of Fq2t, then the number of codeword pairs (U,α U) with intersection dimension 2tm is equal to qt+rqt(qt+1), for some non-negative integer r; and the number of codeword pairs (U,α U) with intersection dimension i,~(i≠ 2tm) is a multiple of qt(qt+1). Some examples have been given to illustrate the results presented in the paper.
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