Root-Hadamard transforms and complementary sequences

July 22, 2019 Β· Declared Dead Β· πŸ› Cryptography and Communications

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Authors Luis A. Medina, Matthew G. Parker, Constanza Riera, Pantelimon Stanica arXiv ID 1907.09360 Category cs.IT: Information Theory Citations 3 Venue Cryptography and Communications Last Checked 4 months ago
Abstract
In this paper we define a new transform on (generalized) Boolean functions, which generalizes the Walsh-Hadamard, nega-Hadamard, $2^k$-Hadamard, consta-Hadamard and all $HN$-transforms. We describe the behavior of what we call the root- Hadamard transform for a generalized Boolean function $f$ in terms of the binary components of $f$. Further, we define a notion of complementarity (in the spirit of the Golay sequences) with respect to this transform and furthermore, we describe the complementarity of a generalized Boolean set with respect to the binary components of the elements of that set.
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