On the time-space complexity of geometric elimination procedures

In [25] and [22] a new algorithmic concept was introduced for the symbolic solution of a zero dimensional complete intersection polynomial equation system satisfying a certain generic smoothness condition. The main innovative point of this algorithmic concept consists in the introduction of a new ge...

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Detalles Bibliográficos
Autor principal: Matera, Guillermo
Publicado: 2001
Materias:
Algebraic complexity theory
Algorithmic elimination theory
Computation tree
Polynomial equation solving
Straight-line program
Symbolic computation
Time-space complexity
Algorithms
Computational complexity
Mathematical models
Mathematical programming
Matrix algebra
Polynomials
Theorem proving
Trees (mathematics)
Geometric elimination procedures
Straight line program
Time space complexity
Geometry
Acceso en línea:https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_09381279_v11_n4_p239_Heintz
http://hdl.handle.net/20.500.12110/paper_09381279_v11_n4_p239_Heintz
Aporte de:
Biblioteca Digital - Facultad de Ciencias Exactas y Naturales (UBA) de Universidad de Buenos Aires
Descripción
Sumario:In [25] and [22] a new algorithmic concept was introduced for the symbolic solution of a zero dimensional complete intersection polynomial equation system satisfying a certain generic smoothness condition. The main innovative point of this algorithmic concept consists in the introduction of a new geometric invariant, called the degree of the input system, and the proof that the most common elimination problems have time complexity which is polynomial in this degree and the length of the input. In this paper we apply this algorithmic concept in order to exhibit an elimination procedure whose space complexity is only quadratic and its time complexity is only cubic in the degree of the input system.

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