The Computational Complexity of the Chow Form

Jeronimo, Gabriela; Krick, Teresa; Sabia, Juan; Sombra, Martín

doi:10.1007/s10208-002-0078-2

Cited by 50 publications

(42 citation statements)

References 54 publications

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“…Together with later algorithms it can be used to count irreducible components in parallel polynomial time. Other algorithms for the equidimensional decomposition are given by Lecerf (2000Lecerf ( , 2003, Jeronimo & Sabia (2002), Jeronimo et al (2004), but these are all ran-…”

Section: Irreducible Componentsmentioning

confidence: 99%

Counting Irreducible Components of Complex Algebraic Varieties

Bürgisser

Scheiblechner

2010

comput. complex.

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We present an algorithm for counting the irreducible components of a complex algebraic variety defined by a fixed number of polynomials encoded as straight-line programs (slps). It runs in polynomial time in the Blum-Shub-Smale (BSS) model and in randomized parallel polylogarithmic time in the Turing model, both measured in the lengths and degrees of the slps. Our algorithm is obtained from an explicit version of Bertini's theorem. For its analysis we further develop a general complexity theoretic framework appropriate for algorithms in algebraic geometry.

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Section: Irreducible Componentsmentioning

confidence: 99%

Counting Irreducible Components of Complex Algebraic Varieties

Bürgisser

Scheiblechner

2010

comput. complex.

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“…In recent years, the multivariate resultant has emerged as one of the most powerful computational tools in elimination theory due to its ability to eliminate several variables simultaneously without introducing many extraneous solutions. Many algorithms with best complexity bounds for problems such as polynomial equation solving and first-order quantifier elimination are strongly based on the multivariate resultant [4,5,15,16,26,38].…”

Section: Introductionmentioning

confidence: 99%

Sparse Differential Resultant for Laurent Differential Polynomials

Yuan

Gao

2015

Found Comput Math

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In this paper, we first introduce the concept of Laurent differentially essential systems and give a criterion for a Laurent differential polynomial system to be Laurent differentially essential in terms of its support matrix. Then, the sparse differential resultant for a Laurent differentially essential system is defined, and its basic properties are proved. In particular, order and degree bounds for the sparse differential resultant are given. Based on these bounds, an algorithm to compute the sparse differential resultant is proposed, which is single exponential in terms of the Jacobi number and the size of the system.

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“…Since then, "Newton-Hensel lifting" in its non-Archimedean versions is primordially present in exact symbolic computation: for example, in univariate rational polynomial factorization in [38] and the breakthrough LLL-polynomial time factorization algorithm [30], and in multivariate polynomial factorization [8], [7], [17], [23]. Also for multivariate polynomial systems solving in the Gröbner basis setting in [36], [37] and in the primitive element setting in [9], [7], [17] and in [16], [15], [21], [22].…”

Section: Introductionmentioning

confidence: 99%

Newton–Hensel Interpolation Lifting

2006

Self Cite

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The main result of this paper is a new version of Newton-Hensel lifting that relates to interpolation questions. It allows one to lift polynomials in Z[x] from information modulo a prime number p = 2 to a power p k for any k, and its originality is that it is a mixed version that not only lifts the coefficients of the polynomial but also its exponents. We show that this result corresponds exactly to a Newton-Hensel lifting of a system of 2t generalized equations in 2t unknowns in the ring of p-adic integers Z p . Finally, we apply our results to sparse polynomial interpolation in Z[x].

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The Computational Complexity of the Chow Form

Cited by 50 publications

References 54 publications

Counting Irreducible Components of Complex Algebraic Varieties

Counting Irreducible Components of Complex Algebraic Varieties

Sparse Differential Resultant for Laurent Differential Polynomials

Newton–Hensel Interpolation Lifting

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