Background
Goldberg, Vladislav Victorovich was born on January 4, 1936 in Moscow. Son of Victor Osherovich Goldberg and Shlema Aronovna Rabinovich. came to the United States, 1979.
(This textbook presents the foundations of tensor calculus...)
This textbook presents the foundations of tensor calculus and the elements of tensor analysis. In addition, the authors consider numerous applications of tensors to geometry, mechanics and physics.While developing tensor calculus, the authors emphasize its relationship with linear algebra. Necessary notions and theorems of linear algebra are introduced and proved in connection with the construction of the apparatus of tensor calculus; prior knowledge is not assumed. For simplicity and to enable the reader to visualize concepts more clearly, all exposition is conducted in three-dimensional space. The principal feature of the book is that the authors use mainly orthogonal tensors, since such tensors are important in applications to physics and engineering.With regard to applications, the authors construct the general theory of second-degree surfaces, study the inertia tensor as well as the stress and strain tensors, and consider some problems of crystallophysics. The last chapter introduces the elements of tensor analysis.All notions introduced in the book, and also the obtained results, are illustrated with numerous examples discussed in the text. Each section of the book presents problems (a total over 300 problems are given). Examples and problems are intended to illustrate, reinforce and deepen the presented material. There are answers to most of the problems, as well as hints and solutions to selected problems at the end of the book.
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(Comprehensive coverage of the foundations, applications, ...)
Comprehensive coverage of the foundations, applications, recent developments, and future of conformal differential geometry Conformal Differential Geometry and Its Generalizations is the first and only text that systematically presents the foundations and manifestations of conformal differential geometry. It offers the first unified presentation of the subject, which was established more than a century ago. The text is divided into seven chapters, each containing figures, formulas, and historical and bibliographical notes, while numerous examples elucidate the necessary theory. Clear, focused, and expertly synthesized, Conformal Differential Geometry and Its Generalizations * Develops the theory of hypersurfaces and submanifolds of any dimension of conformal and pseudoconformal spaces. * Investigates conformal and pseudoconformal structures on a manifold of arbitrary dimension, derives their structure equations, and explores their tensor of conformal curvature. * Analyzes the real theory of four-dimensional conformal structures of all possible signatures. * Considers the analytic and differential geometry of Grassmann and almost Grassmann structures. * Draws connections between almost Grassmann structures and web theory. Conformal differential geometry, a part of classical differential geometry, was founded at the turn of the century and gave rise to the study of conformal and almost Grassmann structures in later years. Until now, no book has offered a systematic presentation of the multidimensional conformal differential geometry and the conformal and almost Grassmann structures. After years of intense research at their respective universities and at the Soviet School of Differential Geometry, Maks A. Akivis and Vladislav V. Goldberg have written this well-conceived, expertly executed volume to fill a void in the literature. Dr. Akivis and Dr. Goldberg supply a deep foundation, applications, numerous examples, and recent developments in the field. Many of the findings that fill these pages are published here for the first time, and previously published results are reexamined in a unified context. The geometry and theory of conformal and pseudoconformal spaces of arbitrary dimension, as well as the theory of Grassmann and almost Grassmann structures, are discussed and analyzed in detail. The topics covered not only advance the subject itself, but pose important questions for future investigations. This exhaustive, groundbreaking text combines the classical results and recent developments and findings. This volume is intended for graduate students and researchers of differential geometry. It can be especially useful to those students and researchers who are interested in conformal and Grassmann differential geometry and their applications to theoretical physics.
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( The present book, a valuable addition to the English-la...)
The present book, a valuable addition to the English-language literature on linear algebra and tensors, constitutes a lucid, eminently readable and completely elementary introduction to this field of mathematics. A special merit of the book is its free use of tensor notation, in particular the Einstein summation convention. The treatment is virtually self-contained. In fact, the mathematical background assumed on the part of the reader hardly exceeds a smattering of calculus and a casual acquaintance with determinants. The authors begin with linear spaces, starting with basic concepts and ending with topics in analytic geometry. They then treat multilinear forms and tensors (linear and bilinear forms, general definition of a tensor, algebraic operations on tensors, symmetric and antisymmetric tensors, etc.), and linear transformation (again basic concepts, the matrix and multiplication of linear transformations, inverse transformations and matrices, groups and subgroups, etc.). The last chapter deals with further topics in the field: eigenvectors and eigenvalues, matrix ploynomials and the Hamilton-Cayley theorem, reduction of a quadratic form to canonical form, representation of a nonsingular transformation, and more. Each individual section — there are 25 in all — contains a problem set, making a total of over 250 problems, all carefully selected and matched. Hints and answers to most of the problems can be found at the end of the book. Dr. Silverman has revised the text and numerous pedagogical and mathematical improvements, and restyled the language so that it is even more readable. With its clear exposition, many relevant and interesting problems, ample illustrations, index and bibliography, this book will be useful in the classroom or for self-study as an excellent introduction to the important subjects of linear algebra and tensors.
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(Will be shipped from US. Brand new copy.)
Will be shipped from US. Brand new copy.
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Goldberg, Vladislav Victorovich was born on January 4, 1936 in Moscow. Son of Victor Osherovich Goldberg and Shlema Aronovna Rabinovich. came to the United States, 1979.
Master of Science in Mathematics, Moscow State University, 1958; Doctor of Philosophy in Mathematics, Moscow State University, 1961.
Senior scientific editor, Public House MIR, Moscow, 1961; associate professor mathematics, Yaroslavl (The Union of Soviet Socialist Republics) State Pedagogical Institute, 1961-1964; professor mathematics, Moscow Institute Steel and Alloys, 1964-1978; senior research scientist in metallurgical laboratory, Moscow Institute Steel and Alloys, since 1968; visiting professor mathematics, Lehigh University, Bethlehem, Pennsylvania, 1979-1981; professor math, New Jersey Institute Technology, Newark, 1981-1985; distinguished professor, New Jersey Institute Technology, Newark, since 1985. Visiting professor mathematics Moscow State University, 1970, 75, U. Waterloo, Ontario, Canada, 1980, Mathematics Institute, U. Stuttgart, Germany, 1982, Mathematics Science Research Institute, Berkeley, California, U. Messina, Italy, 1986, Mathematics Forschungsinstitut Oberwolfach, Germany, 1991, 92, 94, 95, U. Bordeaux, France, 1995, Istanbul Technology U., Turkey, 1996, Hokkaido U., Japan, 1997, Catholic University of Leuven, Belgium, 1997.
(Comprehensive coverage of the foundations, applications, ...)
( The present book, a valuable addition to the English-la...)
(This textbook presents the foundations of tensor calculus...)
(Will be shipped from US. Brand new copy.)
Board directors Hebrew Immigrant Aid Society, New York City, since 1987. Trustee Jewish Federation MetroWest, East Orange, 1987-1990. Vice president Conference on Soviet Jewry of MetroWest, 1987-1992.
Member American Mathematics Society (committee translations from Russian 1985-1988, advising committee for Russian-English Dictionary 1989-1991), Tensor Society.
Married Ludmila Pikuleva, July 5, 1936. Children: Andrew, Ilya.