GCDHEU: Heuristic polynomial GCD algorithm based on integer GCD computation
Copyright policy )GCDHEU: Heuristic polynomial GCD algorithm based on integer GCD computation
Let a and b be two primitive univariate polynomials, and let g be their greatest common divisor. The height of a polynomial is the maximum of the absolute values of its coefficients: let n be greater than twice the heights of a,b, or any of their factors, and let \(h=(a(n),b(n))\). Expand h n-adically as \(h_ 0+h_ 1n+...+h_ kn^ k\) where \(-n/2
- University of Waterloo Canada
Computational Mathematics, Software, source code, etc. for problems pertaining to field theory, Algebra and Number Theory, heuristic methods, Polynomials in real and complex fields: factorization, height of a polynomial, Symbolic computation and algebraic computation, G.C.D. of multivariate polynomials, Polynomials (irreducibility, etc.)
Computational Mathematics, Software, source code, etc. for problems pertaining to field theory, Algebra and Number Theory, heuristic methods, Polynomials in real and complex fields: factorization, height of a polynomial, Symbolic computation and algebraic computation, G.C.D. of multivariate polynomials, Polynomials (irreducibility, etc.)
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