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The Cayley Trick, lifting subdivisions and the Bohne-Dress theorem on zonotopal tilings (2000)

Huber, Birkett ; Rambau, Jörg ; Santos, Francisco

Springer

Journal of the European Mathematical Society 2 (2000), S. 179-198

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ISSN: 1435-9863

Schlagwort(e): Mathematics Subject Classification (1991): 52B11, 52B20, 14M25

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik

Notizen: Abstract. In 1994, Sturmfels gave a polyhedral version of the Cayley Trick of elimination theory: he established an order-preserving bijection between the posets of coherent mixed subdivisions of a Minkowski sum ?1+...+? r of point configurations and of coherent polyhedral subdivisions of the associated Cayley embedding ?(?1,...,? r ). In this paper we extend this correspondence in a natural way to cover also non-coherent subdivisions. As an application, we show that the Cayley Trick combined with results of Santos on subdivisions of Lawrence polytopes provides a new independent proof of the Bohne-Dress theorem on zonotopal tilings. This application uses a combinatorial characterization of lifting subdivisions, also originally proved by Santos.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/s100970050003

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Digitale Medien

Polyhedral end games for polynomial continuation (1998)

Huber, Birkett ; Verschelde, Jan

Springer

Numerical algorithms 18 (1998), S. 91-108

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ISSN: 1572-9265

Schlagwort(e): homotopy continuation ; polynomial systems ; Newton polytopes ; Bernshtein bound ; cycle number ; 14Q99 ; 52A39 ; 52B20 ; 65H10

Quelle: Springer Online Journal Archives 1860-2000

Thema: Informatik , Mathematik

Notizen: Abstract Bernshtein’s theorem provides a generically exact upper bound on the number of isolated solutions a sparse polynomial system can have in (ℂ*)n, with ℂ* = ℂ\{0}. When a sparse polynomial system has fewer than this number of isolated solutions some face system must have solutions in (ℂ*)n. In this paper we address the process of recovering a certificate of deficiency from a diverging solution path. This certificate takes the form of a face system along with approximations of its solutions. We apply extrapolation to estimate the cycle number and the face normal. Applications illustrate the practical usefulness of our approach.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1023/A:1019163811284

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A family of sparse polynomial systems arising in chemical reaction systems (1999)

Gatermann, Karin ; Huber, Birkett

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Publikationsdatum: 2014-02-26

Beschreibung: A class of sparse polynomial systems is investigated which is defined by a weighted directed graph and a weighted bipartite graph. They arise in the model of mass action kinetics for chemical reaction systems. In this application the number of real positive solutions within a certain affine subspace is of particular interest. We show that the simplest cases are equivalent to binomial systems while in general the solution structure is highly determined by the properties of the two graphs. First we recall results by Feinberg and give rigorous proofs. Secondly, we explain how the graphs determine the Newton polytopes of the system of sparse polynomials and thus determine the solution structure. The results on positive solutions from real algebraic geometry are applied to this particular situation. Examples illustrate the theoretical results.

Schlagwort(e): ddc:000

Sprache: Englisch

Materialart: reportzib , doc-type:preprint

Format: application/postscript

Format: application/pdf

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The Cayley Trick, lifting subdivisions and the Bohne-Dress theorem on zonotopal tilings (1999)

Huber, Birkett ; Rambau, Jörg ; Santos, Francisco

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Publikationsdatum: 2014-11-10

Beschreibung: In 1994, Sturmfels gave a polyhedral version of the Cayley Trick of elimination theory: he established an order-preserving bijection between the posets of \emph{coherent} mixed subdivisions of a Minkowski sum $\mathcal{A}_1+\cdots+\mathcal{A}_r$ of point configurations and of \emph{coherent} polyhedral subdivisions of the associated Cayley embedding $\mathcal{C}(\mathcal{A}_1,\dots,\mathcal{A}_r)$. In this paper we extend this correspondence in a natural way to cover also \emph{non-coherent} subdivisions. As an application, we show that the Cayley Trick combined with results of Santos on subdivisions of Lawrence polytopes provides a new independent proof of the Bohne-Dress Theorem on zonotopal tilings. This application uses a combinatorial characterization of lifting subdivisions, also originally proved by Santos.

Schlagwort(e): ddc:000

Sprache: Englisch

Materialart: reportzib , doc-type:preprint

Format: application/postscript

Format: application/pdf

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