Line-parallelisms of PG(n, 2) from Preparata-like codes
Abstract
Partitions of the binary linear Hamming code into Preparata-like codes are known to induce line-parallelisms of PG(n, 2). In this paper, we show that if P is any Preparata-like code contained in the binary linear Hamming code H of the same length, then H can be partitioned into additive translates of P. This generalizes a result of Baker, van Lint, and Wilson who prove this fact for the class of generalized Preparata codes. We give an explicit description for line-parallelisms obtained from such a partition via crooked Preparata-like codes and establish an equivalence criterion for such line-parallelisms.
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