Dubrovin, Fomenko., Novikov Modern Geometry

Modern Geometry - Methods and Applications: Part II: The Geometry and Topology of Manifolds

B. A. Dubrovin, A. T. Fomenko, S. P. Novikov - Modern Geometry - Methods and Applications: Part II: The Geometry and Topology of Manifolds
Published: 1985-09-01 | ISBN: 3540961623, 0387961623 | PDF + DJVU | 432 pages | 11 MB
Modern Geometry - Methods and Applications: Part III: Introduction to Homology Theory [Repost]

B.A. Dubrovin, ‎A.T. Fomenko, ‎S. P. Novikov - Modern Geometry - Methods and Applications: Part III: Introduction to Homology Theory
Published: 1990-11-02 | ISBN: 0387972714, 3540972714 | PDF + DJVU | 416 pages | 78 MB
Modern Geometry - Methods and Applications: Part I: The Geometry of Surfaces, Transformation Groups, and Fields (2nd edition)

B.A. Dubrovin, A.T. Fomenko, S.P. Novikov - Modern Geometry - Methods and Applications: Part I: The Geometry of Surfaces, Transformation Groups, and Fields (2nd edition)
Published: 1991-11-28 | ISBN: 0387976639, 3540976639 | PDF | 470 pages | 73 MB

Modern Geometry - Methods and Applications  eBooks & eLearning

Posted by tanas.olesya at Dec. 17, 2016
Modern Geometry - Methods and Applications

Modern Geometry - Methods and Applications (Graduate Texts in Mathematics) by B.A. Dubrovin
English | 1985 edition (21 Dec. 2012) | ISBN: 1461270111 | 447 Pages | PDF | 20 MB

Up until recently, Riemannian geometry and basic topology were not included, even by departments or faculties of mathematics, as compulsory subjects in a university-level mathematical education.
College Geometry: An Introduction to the Modern Geometry of the Triangle and the Circle

Nathan Altshiller-Court, "College Geometry: An Introduction to the Modern Geometry of the Triangle and the Circle"
English | 2007 | ISBN: 0486458059 | 336 pages | True PDF | 80.6 MB
College Geometry: An Introduction to the Modern Geometry of the Triangle and the Circle

Nathan Altshiller-Court, "College Geometry: An Introduction to the Modern Geometry of the Triangle and the Circle"
2007 | pages: 334 | ISBN: 0486458059 | PDF | 30,7 mb

Poincare Half-Plane (Jones and Bartlett A Gateway to Modern Geometry) by Saul Stahl  eBooks & eLearning

Posted by tanas.olesya at Nov. 20, 2014
Poincare Half-Plane (Jones and Bartlett A Gateway to Modern Geometry) by Saul Stahl

Poincare Half-Plane (Jones and Bartlett A Gateway to Modern Geometry) by Saul Stahl
Jones & Bartlett Publishers; 1st edition | April 9, 1993 | English | ISBN: 086720298X | 302 pages | DJVU | 6 MB

In the 1880s, over fifty years after the discovery of the hyperbolic plane, Poincare pointed out that this plane provides a very useful context for describing the properties of the solutions of an important class of differential equations. Topics include Euclidean rigid motions, inversions, Euclidea

The Novikov Conjecture: Geometry and Algebra [Repost]  eBooks & eLearning

Posted by AlenMiler at Sept. 24, 2014
The Novikov Conjecture: Geometry and Algebra [Repost]

The Novikov Conjecture: Geometry and Algebra (Oberwolfach Seminars) by Wolfgang Lück
Birkhäuser; 2005 edition | November 22, 2004 | English | ISBN: 3764371412 | 266 pages | PDF | 2 MB

These lecture notes contain a guided tour to the Novikov Conjecture and related conjectures due to Baum-Connes, Borel and Farrell-Jones. They begin with basics about higher signatures, Whitehead torsion and the s-Cobordism Theorem.

Modern Geometry with Applications  eBooks & eLearning

Posted by ChrisRedfield at March 17, 2014
Modern Geometry with Applications

George Jennings - Modern Geometry with Applications
Published: 1997-07-01 | ISBN: 038794222X, 354094222X | PDF | 204 pages | 4 MB

The Novikov Conjecture: Geometry and Algebra (repost)  eBooks & eLearning

Posted by interes at Feb. 10, 2014
The Novikov Conjecture: Geometry and Algebra (repost)

The Novikov Conjecture: Geometry and Algebra (Oberwolfach Seminars) by Matthias Kreck and Wolfgang Lück
English | 2005 | ISBN: 3764371412 | Pages: 266 | PDF | 1,6 MB

These lecture notes contain a guided tour to the Novikov Conjecture and related conjectures due to Baum-Connes, Borel and Farrell-Jones. They begin with basics about higher signatures, Whitehead torsion and the s-Cobordism Theorem. Then an introduction to surgery theory and a version of the assembly map is presented.