UID:
almahu_9947366344702882
Format:
1 online resource (409 p.)
ISBN:
1-281-76335-7
,
9786611763350
,
0-08-087320-0
Series Statement:
Pure and applied mathematics ; 10-III
Content:
Spectral Theory of Random Matrices
Note:
Translation of Elements d'Analyse, t.3.
,
Front Cover; Treatise on Analysis; Copyright Page; Contents; Notation; Chapter XVI. DIFFERENTIAL MANIFOLDS; 1. Charts, atlases, manifolds; 2. Examples of differential manifolds. Diffeomorphisms; 3. Differentiable mappings; 4. Differentiable partitions of unity; 5. Tangent spaces, tangent linear mappings, rank; 6. Products of manifolds; 7. Immersions, submersions, subimmersions; 8. Submanifolds; 9. Lie groups; 10. Orbit spaces and homogeneous spaces; 11. Examples: unitary groups, Stiefel manifolds, Grassmannians, projective spaces; 12. Fibrations
,
13. Definition of fibrations by means of charts14. Principal fiber bundles; 15. Vector bundles; 16. Operations on vector bundles; 17. Exact sequences, subbundles, and quotient bundles; 18. Canonical morphisms of vector bundles; 19. Inverse image of a vector bundle; 20. Differential forms; 21. Orientable manifolds and orientations; 22. Change of variables in multiple integrals. Lebesgue measures; 23. Sard's theorem; 24. Integral of a differential n-form over an oriented pure manifold of dimension n; 25. Embedding and approximation theorems. Tubular neighborhoods
,
26. Differentiable homotopies and isotopies27. The fundamental group of a connected manifold; 28. Covering spaces and the fundamental group; 29. The universal covering of a differential manifold; 30. Covering spaces of a Lie group; Chapter XVll. DIFFERENTIAL CALCULUS ON A DIFFERENTIAL MANIFOLD; 1. The spaces &(r)(U) (U open in Rn); 2. Spaces of C8- (resp. Cr) sections of vector bundles; 3. Currents and distributions; 4. Local definition of a current. Support of a current; 5. Currents on an oriented manifold. Distributions on R""; 6. Real distributions. Positive distributions
,
7. Distributions with compact support8. The weak topology on spaces of distributions; 9. Example: finite parts of divergent integrals; 10. Tensor products of distributions; 11. Convolution of distributions on a Lie group; 12. Regularization of distributions; 13. Differential operators and fields of point-distributions; 14. Vector fields as differential operators; 15. The exterior differential of a differential p-form; 16. Connections in a vector bundle; 17. Differential operators associated with a connection; 18. Connections on a differential manifold; 19. The covariant exterior differential
,
20. Curvature and torsion of a connectionAppendix: Multilinear Algebra; 8. Modules. free modules; 9. Duality for free modules; 10. Tensor products of free modules; 11. Tensors; 12. Symmetric and antisymmetric tensors; 13 The exterior algebra; 14 Duality in the exterior algebra; 15. IInterior Products; 16. Nondegenerate alternating bilinear forms. symplectic groups; 17. The symmetric algebra; 18. Derivations and antiderivations of graded algebras; 19. Lie algebras; References; Index
,
English
Additional Edition:
ISBN 0-12-215503-3
Language:
English