The second variation of the Ricci expander entropy
Meng Zhu
TL;DR
This paper calculates the second variation of the Ricci expander entropy to analyze the stability of certain geometric structures, providing insights into the behavior of negative Einstein manifolds.
Contribution
It introduces the computation of the second variation of Ricci expander entropy and discusses the linear stability of compact negative Einstein manifolds.
Findings
Second variation computed for Ricci expander entropy.
Linear stability analysis of negative Einstein manifolds.
Insights into geometric stability properties.
Abstract
We compute the second variation of the Ricci expander entropy and briefly discuss the linear stability of compact negative Einstein manifolds.
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Taxonomy
TopicsGeometric Analysis and Curvature Flows · Geometry and complex manifolds · Advanced Differential Geometry Research