Listar por autor "HORACIO TAPIA RECILLAS"

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Self-Invertible Cubic (Quartic) Permutation Polynomials over Z_p^n with p greater than 7 (p greater than 17) a Prime and Gr öbner Bases

JAVIER ARTURO DIAZ VARGAS; CARLOS JACOB RUBIO BARRIOS; HORACIO TAPIA RECILLAS

Necessary and sufficient conditions for cubic (quartic) permutation polynomials to be self-invertible over the ring Zpn where p >7 (p >17) is a prime number are given, and completely determined. The characterization of ...
Self-invertible cubic (quartic) permutation polynomials over z_p^n with p greater than 7 (p greater than 17) a prime and Gröbner bases

JAVIER ARTURO DIAZ VARGAS; CARLOS JACOB RUBIO BARRIOS; HORACIO TAPIA RECILLAS

Necessary and sufficient conditions for cubic (quartic) permutation polynomials to be self-invertible over the ring Zpn where p >7 (p >17) is a prime number are given, and completely determined. The characterization of ...