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Natural Operations in Differential Geometry - Ivan Kolar, Peter W. Michor, Jan Slovak

Natural Operations in Differential Geometry

Buch | Hardcover
VI, 434 Seiten
1993 | 1993
Springer Berlin (Verlag)
978-3-540-56235-1 (ISBN)
CHF 179,70 inkl. MwSt
The literature on natural bundles and natural operators in differential geometry, was until now, scattered in the mathematical journal literature. This book is the first monograph on the subject, collecting this material in a unified presentation. The book begins with an introduction to differential geometry stressing naturality and functionality, and the general theory of connections on arbitrary fibered manifolds. The functional approach to classical natural bundles is extended to a large class of geometrically interesting categories. Several methods of finding all natural operators are given and these are identified for many concrete geometric problems. After reduction each problem to a finite order setting, the remaining discussion is based on properties of jet spaces, and the basic structures from the theory of jets are therefore described here too in a self-contained manner.
The relations of these geometric problems to corresponding questions in mathematical physics are brought out in several places in the book, and it closes with a very comprehensive bibliography of over 300 items. This book is a timely addition to literature filling the gap that existed here and will be standard reference on natural operators for the next few years.
The aim of this work is threefold: First it should be a monographical work on natural bundles and natural op erators in differential geometry. This is a field which every differential geometer has met several times, but which is not treated in detail in one place. Let us explain a little, what we mean by naturality. Exterior derivative commutes with the pullback of differential forms. In the background of this statement are the following general concepts. The vector bundle A kT* M is in fact the value of a functor, which associates a bundle over M to each manifold M and a vector bundle homomorphism over f to each local diffeomorphism f between manifolds of the same dimension. This is a simple example of the concept of a natural bundle. The fact that exterior derivative d transforms sections of A kT* M into sections of A k+1T* M for every manifold M can be expressed by saying that d is an operator from A kT* M into A k+1T* M.

I. Manifolds and Lie Groups.- II. Differential Forms.- III. Bundles and Connections.- IV. Jets and Natural Bundles.- V. Finite Order Theorems.- VI. Methods for Finding Natural Operators.- VII. Further Applications.- VIII. Product Preserving Functors.- IX. Bundle Functors on Manifolds.- X. Prolongation of Vector Fields and Connections.- XI. General Theory of Lie Derivatives.- XII. Gauge Natural Bundles and Operators.- References.- List of symbols.- Author index.

Erscheint lt. Verlag 4.2.1993
Zusatzinfo VI, 434 p.
Verlagsort Berlin
Sprache englisch
Maße 156 x 234 mm
Gewicht 792 g
Themenwelt Mathematik / Informatik Mathematik Geometrie / Topologie
Naturwissenschaften Physik / Astronomie Quantenphysik
Schlagworte Category over Manifolds • Differentialgeometrie • Differential Geometry • Differenzialgeometrie • Jet • manifold • Mathematical Physics • Natural Bundle • Natural Operator • Operatoren
ISBN-10 3-540-56235-4 / 3540562354
ISBN-13 978-3-540-56235-1 / 9783540562351
Zustand Neuware
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