Power diagrams and Morse Theory

Martijn van Manen; Dirk Siersma

Power diagrams and Morse Theory

Martijn van Manen, Dirk Siersma

Sub Fundamental Mathematics

Research output: Contribution to journal › Article › Academic

Abstract

We study Morse theory of the (power) distance function to a set of points in $\mathbb{R}^n$. We describe the topology of the union of the corresponding set of growing balls by a Morse poset. The Morse poset is related to the power tesselation of $\mathbb{R}^n$. We remark that the power diagrams from computer science are the spines of amoebas in algebraic geometry, or the hypersurfaces in tropical geometry. We show that there exists a discrete Morse function on the coherent triangulation, dual to the power diagram, such that its critical set equals the Morse poset of the power diagram.

Original language	English
Journal	arXiv
Publication status	Published - 1 Aug 2005

Keywords

Mathematics - Metric Geometry
52B55
57Q99
68U05

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http://adsabs.harvard.edu/abs/2005math......8037V

Cite this

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title = "Power diagrams and Morse Theory",

abstract = "We study Morse theory of the (power) distance function to a set of points in $\mathbb{R}^n$. We describe the topology of the union of the corresponding set of growing balls by a Morse poset. The Morse poset is related to the power tesselation of $\mathbb{R}^n$. We remark that the power diagrams from computer science are the spines of amoebas in algebraic geometry, or the hypersurfaces in tropical geometry. We show that there exists a discrete Morse function on the coherent triangulation, dual to the power diagram, such that its critical set equals the Morse poset of the power diagram.",

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author = "{van Manen}, Martijn and Dirk Siersma",

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TY - JOUR

T1 - Power diagrams and Morse Theory

AU - van Manen, Martijn

AU - Siersma, Dirk

PY - 2005/8/1

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N2 - We study Morse theory of the (power) distance function to a set of points in $\mathbb{R}^n$. We describe the topology of the union of the corresponding set of growing balls by a Morse poset. The Morse poset is related to the power tesselation of $\mathbb{R}^n$. We remark that the power diagrams from computer science are the spines of amoebas in algebraic geometry, or the hypersurfaces in tropical geometry. We show that there exists a discrete Morse function on the coherent triangulation, dual to the power diagram, such that its critical set equals the Morse poset of the power diagram.

AB - We study Morse theory of the (power) distance function to a set of points in $\mathbb{R}^n$. We describe the topology of the union of the corresponding set of growing balls by a Morse poset. The Morse poset is related to the power tesselation of $\mathbb{R}^n$. We remark that the power diagrams from computer science are the spines of amoebas in algebraic geometry, or the hypersurfaces in tropical geometry. We show that there exists a discrete Morse function on the coherent triangulation, dual to the power diagram, such that its critical set equals the Morse poset of the power diagram.

KW - Mathematics - Metric Geometry

KW - 52B55

KW - 57Q99

KW - 68U05

M3 - Article

JO - arXiv

JF - arXiv

ER -

Power diagrams and Morse Theory

Abstract

Keywords

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