Geometry With Applications

Introduction to Differential Geometry with applications to Navier-Stokes Dynamics

Troy Story, "Introduction to Differential Geometry with applications to Navier-Stokes Dynamics"
English | 2005 | ISBN: 0595339212 | DJVU | pages: 160 | 0.6 mb

Differential Geometry with Applications to Mechanics and Physics  eBooks & eLearning

Posted by Jeembo at April 7, 2017
Differential Geometry with Applications to Mechanics and Physics

Differential Geometry with Applications to Mechanics and Physics by Yves Talpaert
English | 2000 | ISBN: 0824703855 | 480 Pages | DJVU | 10.6 MB

An introduction to differential geometry with applications to mechanics and physics.
Geometry with Applications and Proofs: Advanced Geometry for Senior High School, Student Text and Background Information

Aad Goddijn, "Geometry with Applications and Proofs: Advanced Geometry for Senior High School, Student Text and Background Information"
English | ISBN: 9462098581 | 2014 | 348 pages | PDF | 27 MB

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

An Introduction to Differential Geometry with Applications to Elasticity [Repost]  eBooks & eLearning

Posted by tanas.olesya at March 3, 2016
An Introduction to Differential Geometry with Applications to Elasticity [Repost]

An Introduction to Differential Geometry with Applications to Elasticity by Philippe G. Ciarlet
English | 22 Feb. 2006 | ISBN: 1402042477 | 211 Pages | PDF | 1 MB

curvilinear coordinates. This treatment includes in particular a direct proof of the three-dimensional Korn inequality in curvilinear coordinates. The fourth and last chapter, which heavily relies on Chapter 2, begins by a detailed description of the nonlinear and linear equations proposed by W.T. Koiter for modeling thin elastic shells.

Tensors and Riemannian Geometry: With Applications to Differential Equations  eBooks & eLearning

Posted by arundhati at Dec. 4, 2015
Tensors and Riemannian Geometry: With Applications to Differential Equations

Nail H. Ibragimov, "Tensors and Riemannian Geometry: With Applications to Differential Equations"
2015 | ISBN-10: 311037949X | 187 pages | PDF | 3 MB

Tensors and Riemannian Geometry With Applications to Differential Equations  eBooks & eLearning

Posted by Underaglassmoon at Dec. 3, 2015
Tensors and Riemannian Geometry With Applications to Differential Equations

Tensors and Riemannian Geometry With Applications to Differential Equations
De Gruyter | Mathematics | August 2015 | ISBN-10: 311037949X | 187 pages | pdf | 3.87 mb

by Ibragimov, Nail H.
Presents Riemannian geometry and Lie group analysis in partial differential equations and modeling
Designed for developing analytical skills in classical and new methods
Practical, concise and allowing easy access to the topic
An Introduction to Riemannian Geometry: With Applications to Mechanics and Relativity

José Natário, Leonor Godinho, "An Introduction to Riemannian Geometry: With Applications to Mechanics and Relativity"
ISBN: 3319086650 | 2014 | EPUB | 467 pages | 10 MB

Lie Sphere Geometry: With Applications to Submanifolds  eBooks & eLearning

Posted by step778 at March 17, 2015
Lie Sphere Geometry: With Applications to Submanifolds

Thomas E. Cecil, "Lie Sphere Geometry: With Applications to Submanifolds"
2007 | pages: 214 | ISBN: 0387746552 | PDF | 2,2 mb

An Introduction to Differential Geometry with Applications to Elasticity [Repost]  eBooks & eLearning

Posted by AlenMiler at Jan. 17, 2015
An Introduction to Differential Geometry with Applications to Elasticity [Repost]

An Introduction to Differential Geometry with Applications to Elasticity by Philippe G. Ciarlet
English | May 22, 2006 | ISBN: 1402042477, 9048170850 | 210 Pages | PDF | 1.6 MB

curvilinear coordinates. This treatment includes in particular a direct proof of the three-dimensional Korn inequality in curvilinear coordinates. The fourth and last chapter, which heavily relies on Chapter 2, begins by a detailed description of the nonlinear and linear equations proposed by W.T. Koiter for modeling thin elastic shells.