Differential Geometry With Applications to Mechanics And Physics (pure And Applied Mathematics): Yves Talpaert

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
The Geometry of Higher-Order Lagrange Spaces: Applications to Mechanics and Physics

The Geometry of Higher-Order Lagrange Spaces: Applications to Mechanics and Physics By Radu Miron (auth.)
1997 | 336 Pages | ISBN: 9048147891 | PDF | 10 MB
The Geometry of Higher-Order Lagrange Spaces: Applications to Mechanics and Physics

The Geometry of Higher-Order Lagrange Spaces: Applications to Mechanics and Physics By Radu Miron (auth.)
1997 | 336 Pages | ISBN: 9048147891 | PDF | 10 MB
Optimization in Elliptic Problems with Applications to Mechanics of Deformable Bodies and Fluid Mechanics

Optimization in Elliptic Problems with Applications to Mechanics of Deformable Bodies and Fluid Mechanics by William G. Litvinov
English | PDF (True) |2000 | 540 Pages | ISBN : 3764361999 | 35.9 MB

This book is intended to be both a thorough introduction to contemporary research in optimization theory for elliptic systems with its numerous applications and a textbook at the undergraduate and graduate level for courses in pure or applied mathematics or in continuum mechanics. Various processes of modern technology and production are described by el­ liptic partial differential equations. Optimization of these processes reduces to op­ timization problems for elliptic systems. The numerical solution of such problems is associated with the solution of the following questions. 1. The setting of the optimization problem ensuring the existence of a solution on a set of admissible controls, which is a subset of some infinite-dimensional vector space. 2. Reduction of the infinite-dimensional optimization problem to a sequence of finite-dimensional problems such that the solutions of the finite-dimensional problems converge, in a sense, to the solution of the infinite-dimensional problem.3. Numerical solution of the finite-dimensional problems.
Optimization in Elliptic Problems with Applications to Mechanics of Deformable Bodies and Fluid Mechanics

Optimization in Elliptic Problems with Applications to Mechanics of Deformable Bodies and Fluid Mechanics by William G. Litvinov
English | PDF (True) |2000 | 540 Pages | ISBN : 3764361999 | 35.9 MB

This book is intended to be both a thorough introduction to contemporary research in optimization theory for elliptic systems with its numerous applications and a textbook at the undergraduate and graduate level for courses in pure or applied mathematics or in continuum mechanics. Various processes of modern technology and production are described by el­ liptic partial differential equations. Optimization of these processes reduces to op­ timization problems for elliptic systems. The numerical solution of such problems is associated with the solution of the following questions. 1. The setting of the optimization problem ensuring the existence of a solution on a set of admissible controls, which is a subset of some infinite-dimensional vector space. 2. Reduction of the infinite-dimensional optimization problem to a sequence of finite-dimensional problems such that the solutions of the finite-dimensional problems converge, in a sense, to the solution of the infinite-dimensional problem.3. Numerical solution of the finite-dimensional problems.
Symmetries of Integro-Differential Equations: With Applications in Mechanics and Plasma Physics

Sergey V. Meleshko, Yurii N. Grigoriev, N. Kh. Ibragimov, "Symmetries of Integro-Differential Equations: With Applications in Mechanics and Plasma Physics"
English | 2010 | ISBN: 9048137969 | PDF | pages: 315 | 1.5 mb

Index Theory with Applications to Mathematics and Physics  eBooks & eLearning

Posted by Jeembo at Sept. 13, 2018
Index Theory with Applications to Mathematics and Physics

Index Theory with Applications to Mathematics and Physics by David D. Bleecker, Bernhelm Booß-Bavnbek
English | 2013 | ISBN: 1571462643 | 792 Pages | DJVU | 19.2 MB

Index Theory with Applications to Mathematics and Physics describes, explains, and explores the Index Theorem of Atiyah and Singer, one of the truly great accomplishments of twentieth-century mathematics whose influence continues to grow, fifty years after its discovery.

Linear Algebra and Group Theory for Physicists and Engineers (Repost)  eBooks & eLearning

Posted by AvaxGenius at Feb. 9, 2020
Linear Algebra and Group Theory for Physicists and Engineers (Repost)

Linear Algebra and Group Theory for Physicists and Engineers by Yair Shapira
English | EPUB | 2019 | 457 Pages | ISBN : 3030178552 | 15.93 MB

This textbook demonstrates the strong interconnections between linear algebra and group theory by presenting them simultaneously, a pedagogical strategy ideal for an interdisciplinary audience. Being approached together at the same time, these two topics complete one another, allowing students to attain a deeper understanding of both subjects. The opening chapters introduce linear algebra with applications to mechanics and statistics, followed by group theory with applications to projective geometry. Then, high-order finite elements are presented to design a regular mesh and assemble the stiffness and mass matrices in advanced applications in quantum chemistry and general relativity.

Linear Algebra and Group Theory for Physicists and Engineers (Repost)  eBooks & eLearning

Posted by AvaxGenius at Jan. 13, 2020
Linear Algebra and Group Theory for Physicists and Engineers (Repost)

Linear Algebra and Group Theory for Physicists and Engineers by Yair Shapira
English | EPUB | 2019 | 457 Pages | ISBN : 3030178552 | 15.93 MB

This textbook demonstrates the strong interconnections between linear algebra and group theory by presenting them simultaneously, a pedagogical strategy ideal for an interdisciplinary audience. Being approached together at the same time, these two topics complete one another, allowing students to attain a deeper understanding of both subjects. The opening chapters introduce linear algebra with applications to mechanics and statistics, followed by group theory with applications to projective geometry. Then, high-order finite elements are presented to design a regular mesh and assemble the stiffness and mass matrices in advanced applications in quantum chemistry and general relativity.

An Introduction to Differential Geometry with Applications to Elasticity  eBooks & eLearning

Posted by insetes at April 23, 2021
An Introduction to Differential Geometry with Applications to Elasticity

An Introduction to Differential Geometry with Applications to Elasticity By Philippe G. Ciarlet
2010 | 215 Pages | ISBN: 9048170850 | PDF | 2 MB