Factoring polynomials over large finite fields*

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Factoring polynomials over large finite fields*

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Symposium on Symbolic and Algebraic Manipulation archive
Proceedings of the second ACM symposium on Symbolic and algebraic manipulation table of contents

Los Angeles, California, United States

Page: 223

Year of Publication: 1971

Author

E. R. Berlekamp

Sponsors

SIGNUM: ACM Special Interest Group on Numerical Mathematics
SIGART: ACM Special Interest Group on Artificial Intelligence
SIAM : Society for Industrial and Applied Mathematics
SIGPLAN: ACM Special Interest Group on Programming Languages
SIGSAM: ACM Special Interest Group on Symbolic and Algebraic Manipulation

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 7, Downloads (12 Months): 53, Citation Count: 2

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ABSTRACT

This paper reviews some of the known algorithms for factoring polynomials over finite fields and presents a new deterministic procedure for reducing the problem of factoring an arbitrary polynomial over the Galois field GF(p m) to the problem of finding the roots in GF(p) of certain other polynomials over GF(p). The amount of computation and the storage space required by these algorithms are algebraic in both the degree of the polynomial to be factored and the logarithm of the order of the finite field. Certain observations on the application of these methods to the factorization of polynomials over the rational integers are also included.

CITED BY 2

	Joel Moses, Symbolic integration the stormy decade, Proceedings of the second ACM symposium on Symbolic and algebraic manipulation, p.427-440, March 23-25, 1971, Los Angeles, California, United States
	Joel Moses, Symbolic integration: the stormy decade, Communications of the ACM, v.14 n.8, p.548-560, Aug. 1971