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2016

Patterson-Wiedemann Type Functions on 21 Variables With Nonlinearity Greater Than Bent Concatenation Bound

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Patterson-Wiedemann Type Functions on 21 Variables With Nonlinearity Greater Than Bent Concatenation Bound
Nonlinearity is one of the most challenging combinatorial property in the domain of Boolean function research. Obtaining nonlinearity greater than the bent concatenation bound for odd number of variables continues to be one of the most sought after combinatorial research problems. The pioneering result in this direction has been discovered by Patterson and Wiedemann in 1983 (IEEE-IT), which considered Boolean functions on 5 × 3 = 15 variables that are invariant under the actions of the cyclic group GF(25 ) ∗ · GF(23 ) ∗ as well as the group of Frobenius authomorphisms. Some of these Boolean functions posses nonlinearity greater than the bent concatenation bound. The next possible option for exploring such functions is on 7×3 = 21 variables. However, obtaining such functions remained elusive for more than three decades even after substantial efforts as evident in the literature. In this paper, we exploit combinatorial arguments together with heuristic search to demonstrate such ...
Selçuk Kavut, Subhamoy Maitra
Added 11 Apr 2016
Updated 11 Apr 2016
Type Journal
Year 2016
Where TIT
Authors Selçuk Kavut, Subhamoy Maitra
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