Inverse functions of polynomials and its applications to initialize the search of solutions of polynomials and polynomial systems

Joaquin Moreno; A. Saiz

doi:10.1007/s11075-011-9453-x

Inverse functions of polynomials and its applications to initialize the search of solutions of polynomials and polynomial systems

Numerical Algorithms ◽

10.1007/s11075-011-9453-x ◽

2011 ◽

Vol 58 (2) ◽

pp. 203-233 ◽

Cited By ~ 2

Author(s):

Joaquin Moreno ◽

A. Saiz

Keyword(s):

Polynomial Systems ◽

Inverse Functions

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The Convex Polytopes and Homogeneous Coordinate Rings of Bivariate Polynomials

Scientific Research Journal ◽

10.24191/srj.v16i2.9346 ◽

2019 ◽

Vol 16 (2) ◽

pp. 1

Author(s):

Shamsatun Nahar Ahmad ◽

Nor’Aini Aris ◽

Azlina Jumadi

Keyword(s):

Convex Polytopes ◽

Polynomial Systems ◽

Matrix Formulation ◽

Bivariate Polynomials ◽

Homogeneous Coordinates ◽

The Matrix ◽

Projective Vector ◽

Coordinate Rings ◽

Resultant Matrix ◽

The Given

Concepts from algebraic geometry such as cones and fans are related to toric varieties and can be applied to determine the convex polytopes and homogeneous coordinate rings of multivariate polynomial systems. The homogeneous coordinates of a system in its projective vector space can be associated with the entries of the resultant matrix of the system under consideration. This paper presents some conditions for the homogeneous coordinates of a certain system of bivariate polynomials through the construction and implementation of the Sylvester-Bèzout hybrid resultant matrix formulation. This basis of the implementation of the Bèzout block applies a combinatorial approach on a set of linear inequalities, named 5-rule. The inequalities involved the set of exponent vectors of the monomials of the system and the entries of the matrix are determined from the coefficients of facets variable known as brackets. The approach can determine the homogeneous coordinates of the given system and the entries of the Bèzout block. Conditions for determining the homogeneous coordinates are also given and proven.

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Upper Bounds for Newton’s Method on Monotone Polynomial Systems, and P-Time Model Checking of Probabilistic One-Counter Automata

Journal of the ACM ◽

10.1145/2789208 ◽

2015 ◽

Vol 62 (4) ◽

pp. 1-33 ◽

Cited By ~ 1

Author(s):

Alistair Stewart ◽

Kousha Etessami ◽

Mihalis Yannakakis

Keyword(s):

Model Checking ◽

Newton’S Method ◽

Newton's Method ◽

Polynomial Systems ◽

Upper Bounds ◽

Time Model

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Comprehensive Characteristic Decomposition of Parametric Polynomial Systems

Proceedings of the 2021 on International Symposium on Symbolic and Algebraic Computation ◽

10.1145/3452143.3465536 ◽

2021 ◽

Author(s):

Rina Dong ◽

Dong Lu ◽

Chenqi Mou ◽

Dongming Wang

Keyword(s):

Polynomial Systems ◽

Characteristic Decomposition

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Algorithms for computing triangular decomposition of polynomial systems

Journal of Symbolic Computation ◽

10.1016/j.jsc.2011.12.023 ◽

2012 ◽

Vol 47 (6) ◽

pp. 610-642 ◽

Cited By ~ 34

Author(s):

Changbo Chen ◽

Marc Moreno Maza

Keyword(s):

Polynomial Systems ◽

Triangular Decomposition

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On the first fall degree of summation polynomials

Journal of Mathematical Cryptology ◽

10.1515/jmc-2017-0022 ◽

2019 ◽

Vol 13 (3-4) ◽

pp. 229-237

Author(s):

Stavros Kousidis ◽

Andreas Wiemers

Keyword(s):

Elliptic Curve ◽

Gröbner Basis ◽

Discrete Logarithm ◽

Polynomial Systems ◽

Discrete Logarithm Problem ◽

Grobner Basis ◽

Weil Descent ◽

Degree Bound

Abstract We improve on the first fall degree bound of polynomial systems that arise from a Weil descent along Semaev’s summation polynomials relevant to the solution of the Elliptic Curve Discrete Logarithm Problem via Gröbner basis algorithms.

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