An Extension of Mok's Theorem on the Generalized Frankel Conjecture

Hui-Ling Gu; Zhu-Hong Zhang

arXiv:0709.4086·math.DG·October 2, 2007

An Extension of Mok's Theorem on the Generalized Frankel Conjecture

Hui-Ling Gu, Zhu-Hong Zhang

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TL;DR

This paper extends Mok's theorem related to the generalized Frankel conjecture, focusing on the condition of orthogonal bisectional curvature, advancing understanding in complex differential geometry.

Contribution

It provides a new extension of Mok's theorem specifically under the orthogonal bisectional curvature condition, broadening the scope of the original conjecture.

Findings

01

Extended Mok's theorem under new curvature conditions

02

Enhanced understanding of the generalized Frankel conjecture

03

Potential implications for complex geometry

Abstract

In this paper, we will give an extension of Mok's theorem on the generalized Frankel conjecture under the condition of the orthogonal bisectional curvature.

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Taxonomy

TopicsGeometric Analysis and Curvature Flows · Geometry and complex manifolds · Advanced Algebra and Geometry