The subset of R3 realizing metrics on the curve complex

Faze Zhang; Ruifeng Qiu; Yanqing Zou

doi:10.1016/j.topol.2015.07.011

The subset of R³ realizing metrics on the curve complex

Faze Zhang, Ruifeng Qiu, Yanqing Zou

School of Mathematical Sciences

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

For each point V, a subset of R³, we define a distance on the one skeleton of curve complex for each point and prove that (1) for each point in V with all positive entries, the one skeleton of curve complex under this distance is a metric space and δ-hyperbolic for some δ∈R⁺; (2) for each point in V with at least one non-positive entry, the diameter of vertices of curve complex under this distance is finite.

Original language	English
Pages (from-to)	259-269
Number of pages	11
Journal	Topology and its Applications
Volume	193
DOIs	https://doi.org/10.1016/j.topol.2015.07.011
State	Published - 5 Sep 2015

Keywords

Curve complex
Metric space
δ-hyperbolicity

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10.1016/j.topol.2015.07.011

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N2 - For each point V, a subset of R3, we define a distance on the one skeleton of curve complex for each point and prove that (1) for each point in V with all positive entries, the one skeleton of curve complex under this distance is a metric space and δ-hyperbolic for some δ∈R+; (2) for each point in V with at least one non-positive entry, the diameter of vertices of curve complex under this distance is finite.

AB - For each point V, a subset of R3, we define a distance on the one skeleton of curve complex for each point and prove that (1) for each point in V with all positive entries, the one skeleton of curve complex under this distance is a metric space and δ-hyperbolic for some δ∈R+; (2) for each point in V with at least one non-positive entry, the diameter of vertices of curve complex under this distance is finite.

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KW - Metric space

KW - δ-hyperbolicity

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DO - 10.1016/j.topol.2015.07.011

M3 - 文章

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VL - 193

SP - 259

EP - 269

JO - Topology and its Applications

JF - Topology and its Applications

ER -

The subset of R³ realizing metrics on the curve complex

Abstract

Keywords

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