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On a class of permutation polynomials over rings of residues modulo $2^n$
A. V. Akishin Moscow State Technical University of Radio Engineering, Electronics and Automatics, Moscow
Abstract:
We consider mappings of the residue rings modulo $2^n$ representable as polynomials with rational coefficients. Conditions ensuring that such a polynomial define a permutation of a ring are described.
Key words:
incompatible polynomials, residue rings, pseudo-random number generators.
Received 30.VII.2012
Citation:
A. V. Akishin, “On a class of permutation polynomials over rings of residues modulo $2^n$”, Mat. Vopr. Kriptogr., 4:2 (2013), 5–15
Linking options:
https://www.mathnet.ru/eng/mvk78https://doi.org/10.4213/mvk78 https://www.mathnet.ru/eng/mvk/v4/i2/p5
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Abstract page: | 401 | Full-text PDF : | 250 | References: | 54 |
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