Geometry Topologie And Physics

Categorification in Geometry, Topology, and Physics  eBooks & eLearning

Posted by arundhati at Sept. 13, 2017
Categorification in Geometry, Topology, and Physics

Anna Beliakova, Aaron D. Lauda, "Categorification in Geometry, Topology, and Physics"
2017 | ISBN-10: 1470428210 | 268 pages | PDF | 2 MB

Geometry, Topology and Physics (2nd Edition) [Repost]  eBooks & eLearning

Posted by ChrisRedfield at March 28, 2014
Geometry, Topology and Physics (2nd Edition) [Repost]

Mikio Nakahara - Geometry, Topology and Physics (2nd Edition)
Published: 2003-06-04 | ISBN: 0750306068 | PDF | 596 pages | 5 MB

Nonlinear Partial Differential Equations in Geometry and Physics by Garth Baker  eBooks & eLearning

Posted by tanas.olesya at July 26, 2015
Nonlinear Partial Differential Equations in Geometry and Physics by Garth Baker

Nonlinear Partial Differential Equations in Geometry and Physics by Garth Baker
English | Jan. 1, 1997 | ISBN: 3764354933 | 165 Pages | PDF | 5 MB

The subject of nonlinear partial differential equations is experiencing a period of intense activity in the study of systems underlying basic theories in geometry, topology and physics. These mathematical models share the property of being derived from variational principles

Lie Groups, Differential Equations, and Geometry: Advances and Surveys  eBooks & eLearning

Posted by AvaxGenius at Sept. 20, 2017
Lie Groups, Differential Equations, and Geometry: Advances and Surveys

Lie Groups, Differential Equations, and Geometry: Advances and Surveys By Prof. Giovanni Falcone
English | PDF,EPUB | 2017 | 368 Pages | ISBN : 3319621807 | 10.07 MB

This book collects a series of contributions addressing the various contexts in which the theory of Lie groups is applied. A preliminary chapter serves the reader both as a basic reference source and as an ongoing thread that runs through the subsequent chapters.

Stacks and Categories in Geometry, Topology, and Algebra  eBooks & eLearning

Posted by nebulae at Sept. 16, 2017
Stacks and Categories in Geometry, Topology, and Algebra

Tony Pantev, Carlos Simpson, Bertrand Toen, Michel Vaquie, Gabriele Vezzosi, "Stacks and Categories in Geometry, Topology, and Algebra"
English | ISBN: 1470415577 | 2015 | 334 pages | PDF | 2 MB
Quantum Modeling of Complex Molecular Systems (Challenges and Advances in Computational Chemistry and Physics) [Repost]

Quantum Modeling of Complex Molecular Systems (Challenges and Advances in Computational Chemistry and Physics) by Jean-Louis Rivail
English | 28 Oct. 2015 | ISBN: 3319216252 | 523 Pages | PDF | 13.98 MB

This multi-author contributed volume includes methodological advances and original applications to actual chemical or biochemical phenomena which were not possible before the increased sophistication of modern computers.

Noncommutative Birational Geometry, Representations and Combinatorics  eBooks & eLearning

Posted by arundhati at Sept. 13, 2017
Noncommutative Birational Geometry, Representations and Combinatorics

Arkady Berenstein, Vladimir Retakh, "Noncommutative Birational Geometry, Representations and Combinatorics"
2013 | ISBN-10: 082188980X | 250 pages | PDF | 2 MB

Arithmetic, Geometry, Cryptography and Coding Theory  eBooks & eLearning

Posted by arundhati at Sept. 13, 2017
Arithmetic, Geometry, Cryptography and Coding Theory

Alp Bassa, David Kohel, "Arithmetic, Geometry, Cryptography and Coding Theory"
2017 | ISBN-10: 1470428105 | 196 pages | PDF | 2 MB

Categorification and Higher Representation Theory  eBooks & eLearning

Posted by arundhati at Sept. 13, 2017
Categorification and Higher Representation Theory

Anna Beliakova, Aaron D. Lauda, "Categorification and Higher Representation Theory"
2017 | ISBN-10: 1470424606 | 363 pages | PDF | 3 MB
Clifford Algebras and their Applications in Mathematical Physics Volume 1: Algebra and Physics

Clifford Algebras and their Applications in Mathematical Physics Volume 1: Algebra and Physics By Rafał Abłamowicz, Bertfried Fauser
English | PDF | 2000 | 470 Pages | ISBN : 1461271169 | 36.5 MB

The plausible relativistic physical variables describing a spinning, charged and massive particle are, besides the charge itself, its Minkowski (four) po­ sition X, its relativistic linear (four) momentum P and also its so-called Lorentz (four) angular momentum E # 0, the latter forming four trans­ lation invariant part of its total angular (four) momentum M.