There is a differential operator ∂ mapping 1D functions φ : G → C to 2D functions ∂φ: G x G → C which are coboundaries, the simplest form of cocycle. Differentially k-uniform 1D functions determine coboundaries with the same distribution. Extending the idea of differential uniformity to cocycles gives a unified perspective from which to approach existence and construction problems for highly nonlinear functions, sought for their resistance to differential cryptanalysis. We describe two constructions of 2D differentially 2-uniform (APN) cocycles over GF(2α), of which one gives 1D binary APN functions. © Springer-Verlag Berlin Heidelberg 2003.
CITATION STYLE
Horadam, K. J. (2003). Differentially 2-uniform cocycles - The binary case. Lecture Notes in Computer Science (Including Subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), 2643, 150–157. https://doi.org/10.1007/3-540-44828-4_17
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