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Factoring polynomials over Z4 and over certain Galois rings

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posted on 2006-08-21, 15:50 authored by Ana SalageanAna Salagean
It is known that univariate polynomials over finite local rings factor uniquely into primary pairwise coprime factors. Primary polynomials are not necessarily irreducible. Here we describe a factorisation into irreducible factors for primary polynomials over Z4 and more generally over Galois rings of characteristic p2. An algorithm is also given. As an application, we factor xn-1 and xn+1 over such rings.

History

School

  • Science

Department

  • Computer Science

Pages

206200 bytes

Citation

SALAGEAN, A.M., 2005. Factoring polynomials over Z4 and over certain Galois rings. Finite fields and their applications, 11 (1), pp. 56-70

Publisher

© Elsevier

Publication date

2005

Notes

This article was published in the journal, Finite fields and their applications [© Elsevier] and is also available at: http://www.sciencedirect.com/science/journal/10715797

ISSN

1071-5797

Language

  • en

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