Introduction to Tensor Analysis and the Calculus of Moving Surfaces

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This textbook is distinguished from other texts on the subject by the depth of the presentation and the discussion of the calculus of moving surfaces, which is an extension of tensor calculus to deforming manifolds.

Designed for advanced undergraduate and graduate students, this text invites its audience to take a fresh look at previously learned material through the prism of tensor calculus. Once the framework is mastered, the student is introduced to new material which includes differential geometry on manifolds, shape optimization, boundary perturbation and dynamic fluid film equations.

The language of tensors, originally championed by Einstein, is as fundamental as the languages of calculus and linear algebra and is one that every technical scientist ought to speak. The tensor technique, invented at the turn of the 20th century, is now considered classical. Yet, as the author shows, it remains remarkably vital and relevant. The author’s skilled lecturing capabilities are evident by the inclusion of insightful examples and a plethora of exercises. A great deal of material is devoted to the geometric fundamentals, the mechanics of change of variables, the proper use of the tensor notation and the discussion of the interplay between algebra and geometry. The early chapters have many words and few equations. The definition of a tensor comes only in Chapter 6 – when the reader is ready for it. While this text maintains a consistent level of rigor, it takes great care to avoid formalizing the subject.

The last part of the textbook is devoted to the Calculus of Moving Surfaces. It is the first textbook exposition of this important technique and is one of the gems of this text. A number of exciting applications of the calculus are presented including shape optimization, boundary perturbation of boundary value problems and dynamic fluid film equations developed by the author in recent years. Furthermore, the moving surfaces framework is used to offer new derivations of classical results such as the geodesic equation and the celebrated Gauss-Bonnet theorem.

Author(s): Pavel Grinfeld
Edition: 1
Publisher: Springer-Verlag New York
Year: 2013

Language: English
Pages: 302
Tags: Differential Geometry; Calculus of Variations and Optimal Control; Optimization; Linear and Multilinear Algebras, Matrix Theory

Front Matter....Pages i-xiii
Why Tensor Calculus?....Pages 1-7
Front Matter....Pages 9-9
Rules of the Game....Pages 11-20
Coordinate Systems and the Role of Tensor Calculus....Pages 21-34
Change of Coordinates....Pages 35-51
The Tensor Description of Euclidean Spaces....Pages 53-73
The Tensor Property....Pages 75-92
Elements of Linear Algebra in Tensor Notation....Pages 93-104
Covariant Differentiation....Pages 105-132
Determinants and the Levi-Civita Symbol....Pages 133-157
Front Matter....Pages 159-159
The Tensor Description of Embedded Surfaces....Pages 161-184
The Covariant Surface Derivative....Pages 185-197
Curvature....Pages 199-213
Embedded Curves....Pages 215-233
Integration and Gauss’s Theorem....Pages 235-246
Front Matter....Pages 247-247
The Foundations of the Calculus of Moving Surfaces....Pages 249-265
Extension to Arbitrary Tensors....Pages 267-277
Applications of the Calculus of Moving Surfaces....Pages 279-295
Back Matter....Pages 297-302