Constructing Orthogonal Latin Squares from Linear Cellular Automata

October 01, 2016 ยท The Ethereal ยท ๐Ÿ› arXiv.org

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Authors Luca Mariot, Enrico Formenti, Alberto Leporati arXiv ID 1610.00139 Category cs.DM: Discrete Mathematics Cross-listed cs.CR, cs.FL, nlin.CG Citations 12 Venue arXiv.org Last Checked 2 months ago
Abstract
We undertake an investigation of combinatorial designs engendered by cellular automata (CA), focusing in particular on orthogonal Latin squares and orthogonal arrays. The motivation is of cryptographic nature. Indeed, we consider the problem of employing CA to define threshold secret sharing schemes via orthogonal Latin squares. We first show how to generate Latin squares through bipermutive CA. Then, using a characterization based on Sylvester matrices, we prove that two linear CA induce a pair of orthogonal Latin squares if and only if the polynomials associated to their local rules are relatively prime.
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