<--- Back to Details
First PageDocument Content
Algebra / Mathematics / Polynomials / Computer algebra / Polynomial / General number field sieve / Resultant / Irreducible polynomial / Factorization / Polynomial greatest common divisor / Degree of a polynomial
Date: 2018-10-24 18:51:52
Algebra
Mathematics
Polynomials
Computer algebra
Polynomial
General number field sieve
Resultant
Irreducible polynomial
Factorization
Polynomial greatest common divisor
Degree of a polynomial

MATHEMATICS OF COMPUTATION Volume 00, Number 0, Pages 000–000 SXXBETTER POLYNOMIALS FOR GNFS SHI BAI, CYRIL BOUVIER, ALEXANDER KRUPPA, AND PAUL ZIMMERMANN

Add to Reading List

Source URL: cosweb1.fau.edu

Download Document from Source Website

File Size: 208,56 KB

Share Document on Facebook

Similar Documents

Around cubic hypersurfaces Olivier Debarre June 23, 2015 Abstract A cubic hypersurface X is defined by one polynomial equation of degree 3 in n variables with coefficients in a field K, such as

Around cubic hypersurfaces Olivier Debarre June 23, 2015 Abstract A cubic hypersurface X is defined by one polynomial equation of degree 3 in n variables with coefficients in a field K, such as

DocID: 1xTdZ - View Document

INTERSECTIONS OF POLYNOMIAL ORBITS, AND A DYNAMICAL MORDELL-LANG CONJECTURE DRAGOS GHIOCA, THOMAS J. TUCKER, AND MICHAEL E. ZIEVE Abstract. We prove that if nonlinear complex polynomials of the same degree have orbits wi

INTERSECTIONS OF POLYNOMIAL ORBITS, AND A DYNAMICAL MORDELL-LANG CONJECTURE DRAGOS GHIOCA, THOMAS J. TUCKER, AND MICHAEL E. ZIEVE Abstract. We prove that if nonlinear complex polynomials of the same degree have orbits wi

DocID: 1tdLY - View Document

Facts about two-dimensional polynomialsGiven: f (x, y) = f00 + f10x + f01y + f11xy + ... + fttxty t ∈ F[x, y] Fact 1: fy0 (x) := f (x, y0) is a one-dimensional polynomial of degree t. Proof: f (x, y0) = (f00 +

Facts about two-dimensional polynomialsGiven: f (x, y) = f00 + f10x + f01y + f11xy + ... + fttxty t ∈ F[x, y] Fact 1: fy0 (x) := f (x, y0) is a one-dimensional polynomial of degree t. Proof: f (x, y0) = (f00 +

DocID: 1rNBK - View Document

A Characterization of Semisimple Plane Polynomial Automorphisms. Jean-Philippe FURTER, Dpt. of Math., Univ. of La Rochelle, av. M. Crépeau, La Rochelle, FRANCE email:

A Characterization of Semisimple Plane Polynomial Automorphisms. Jean-Philippe FURTER, Dpt. of Math., Univ. of La Rochelle, av. M. Crépeau, La Rochelle, FRANCE email:

DocID: 1raZ0 - View Document

EQUATIONS FOR CHOW VARIETIES, THEIR SECANT VARIETIES AND OTHER VARIETIES ARISING IN COMPLEXITY THEORY A Dissertation by YONGHUI GUAN

EQUATIONS FOR CHOW VARIETIES, THEIR SECANT VARIETIES AND OTHER VARIETIES ARISING IN COMPLEXITY THEORY A Dissertation by YONGHUI GUAN

DocID: 1qIdU - View Document