Uniqueness of K\"ahler Ricci shrinkers on toric orbifolds
Yu Li, Wenjia Zhang
TL;DR
This paper proves the uniqueness of Kähler Ricci shrinkers on toric orbifolds, extending known results from toric manifolds to a broader class of geometric structures.
Contribution
It establishes the first uniqueness theorem for Kähler Ricci shrinkers specifically on toric orbifolds, broadening the scope of previous work on toric manifolds.
Findings
Uniqueness of Kähler Ricci shrinkers on toric orbifolds is proven.
Extension of previous results from toric manifolds to orbifolds.
Provides a foundational result for the classification of Ricci shrinkers in orbifold settings.
Abstract
In this paper, we prove the uniqueness of K\"ahler Ricci shrinkers on toric orbifolds, extending the corresponding results previously established for toric manifolds.
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Geometry and complex manifolds · Geometric and Algebraic Topology