On quasi-Albanese morphisms for log canonical Calabi-Yau pairs

Yiming Zhu

arXiv:2511.14580·math.AG·January 19, 2026

On quasi-Albanese morphisms for log canonical Calabi-Yau pairs

Yiming Zhu

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TL;DR

This paper investigates the structure of quasi-Albanese morphisms in log canonical Calabi-Yau pairs, providing new insights and characterizations, including a criterion for identifying toric pairs.

Contribution

It offers new structural results on quasi-Albanese morphisms and characterizes toric pairs within the context of log canonical Calabi-Yau pairs.

Findings

01

Structural results on quasi-Albanese morphisms

02

Characterization of toric pairs

03

Applications to log canonical Calabi-Yau pairs

Abstract

In this note, we study quasi-Albanese morphisms for log canonical Calabi-Yau pairs and obtain several structural results. As an application, we prove a characterization of toric pairs.

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Taxonomy

TopicsAdvanced Combinatorial Mathematics · Algebraic Geometry and Number Theory · Geometry and complex manifolds