A Spinorial Perelman's Functional: Critical Points and Gradient Flow
Abstract
In this article, we introduce an energy functional on closed Riemannian spin manifolds which unifies Perelman's W- and F-functionals, Baldauf-Ouzch's E-functional, and Dirchlet energy for spinors. We compute its first variation formula, and show that its critical points under natural constraints are twisted Ricci solitons and eigen-spinsors of the weighted Dirac operator. We introduce a negative L2-gradient flow of this functional, and establish its short-time existence and uniqueness via contraction mapping methods.
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