Nonholonomic Clifford and Finsler Structures, Non-Commutative Ricci Flows, and Mathematical Relativity

In this summary of Habilitation Thesis, it is outlined author's 18 years research activity on mathematical physics, geometric methods in particle physics and gravity, modifications and applications (after defending his PhD thesis in 1994). Ten most relevant publications are structured conventio...

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Bibliographic Details
Published inarXiv.org
Main Author Vacaru, Sergiu I
Format Paper
LanguageEnglish
Published Ithaca Cornell University Library, arXiv.org 21.04.2012
Subjects
Gravitation
Nonlinear dynamics
Operators (mathematics)
Particle physics
Relativity
Solitary waves
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Summary:In this summary of Habilitation Thesis, it is outlined author's 18 years research activity on mathematical physics, geometric methods in particle physics and gravity, modifications and applications (after defending his PhD thesis in 1994). Ten most relevant publications are structured conventionally into three "strategic directions": 1) nonholonomic geometric flows evolutions and exact solutions for Ricci solitons and field equations in (modified) gravity theories; 2) geometric methods in quantization of models with nonlinear dynamics and anisotropic field interactions; 3) (non) commutative geometry, almost Kaehler and Clifford structures, Dirac operators and effective Lagrange-Hamilton and Riemann-Finsler spaces.
ISSN:2331-8422