Distance Distributions of Cyclic Orbit Codes
The distance distribution of a code is the vector whose i^th entry is the number of pairs of codewords with distance i. We investigate the structure of the distance distribution for cyclic orbit codes, which are subspace codes generated by the action of F_q^n^* on an F_q-subspace U of F_q^n. We show that for optimal full-length orbit codes the distance distribution depends only on q, n, and the dimension of U. For full-length orbit codes with lower minimum distance, we provide partial results towards a characterization of the distance distribution, especially in the case that any two codewords intersect in a space of dimension at most 2. Finally, we briefly address the distance distribution of a union of optimal full-length orbit codes.
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