Estimates for solutions of Dirac equations and an application to a geometric elliptic-parabolic problem

被引：11

作者：

Chen, Qun ^{[1
]}

Jost, Jurgen ^{[2
]}

Sun, Linlin ^{[1
]}

Zhu, Miaomiao ^{[3
]}

机构：

[1] Wuhan Univ, Sch Math & Stat, Wuhan 430072, Hubei, Peoples R China

[2] Max Planck Inst Math Sci, Inselstr 22, D-04103 Leipzig, Germany

[3] Shanghai Jiao Tong Univ, Sch Math Sci, 800 Dongchuan Rd, Shanghai 200240, Peoples R China

来源：

JOURNAL OF THE EUROPEAN MATHEMATICAL SOCIETY | 2019年 / 21卷 / 03期

基金：

芬兰科学院; 欧洲研究理事会;

关键词：

Dirac equation; existence; uniqueness; chiral boundary condition; Dirac-harmonic map flow; BOUNDARY-VALUE-PROBLEMS; HARMONIC MAPS; SPECTRAL ASYMMETRY; REGULARITY; OPERATORS; THEOREMS; MANIFOLDS; EVOLUTION; MAPPINGS; INDEX;

D O I：

10.4171/JEMS/847

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We develop estimates for the solutions and derive existence and uniqueness results of various local boundary value problems for Dirac equations that improve all relevant results known in the literature. With these estimates at hand, we derive a general existence, uniqueness and regularity theorem for solutions of Dirac equations with such boundary conditions. We also apply these estimates to a new nonlinear elliptic-parabolic problem, the Dirac-harmonic heat flow on Rie-mannian spin manifolds. This problem is motivated by the supersymmetric nonlinear sigma-model and combines a harmonic heat flow type equation with a Dirac equation that depends nonlinearly on the flow.

引用

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页码：665 / 707

页数：43

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