On permutation polynomials over finite fields.
Mollin, R.A., Small, C. (1987)
International Journal of Mathematics and Mathematical Sciences
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Displaying similar documents to “Permutation binomials.”
On permutation polynomials over finite fields.
On polynomials of the form .
Akbary, Amir, Wang, Qiang (2007)
International Journal of Mathematics and Mathematical Sciences
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On generalized Redei functions.
Matthews, R., Lidl, R. (1988)
International Journal of Mathematics and Mathematical Sciences
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On orthogonal systems and permutation polynomials in several variables
R. Lidl, Harald Niederreiter (1973)
Acta Arithmetica
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Permutation polynomials in several variables over finite fields
Gary Mullen (1976)
Acta Arithmetica
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Quasi-permutation polynomials
Vichian Laohakosol, Suphawan Janphaisaeng (2010)
Czechoslovak Mathematical Journal
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A quasi-permutation polynomial is a polynomial which is a bijection from one subset of a finite field onto another with the same number of elements. This is a natural generalization of the familiar permutation polynomials. Basic properties of quasi-permutation polynomials are derived. General criteria for a quasi-permutation polynomial extending the well-known Hermite's criterion for permutation polynomials as well as a number of other criteria depending on the permuted domain and range...
On group-permutation polynomials
Brison, Owen J. (1993)
Portugaliae mathematica
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The number of permutation binomials over where and are primes.
Masuda, A., Panario, D., Wang, Q. (2006)
The Electronic Journal of Combinatorics [electronic only]
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Linear permutation polynomials with coefficients in a subfield
J. Brawley, L. Carlitz, Theresa Vaughan (1973)
Acta Arithmetica
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