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Full Description
De Rham cohomology is the cohomology of differential forms. This book offers a self-contained exposition to this subject and to the theory of characteristic classes from the curvature point of view. It requires no prior knowledge of the concepts of algebraic topology or cohomology. The first ten chapters study cohomology of open sets in Euclidean space, treat smooth manifolds and their cohomology and end with integration on manifolds. The last eleven chapters include Morse theory, index of vector fields, Poincaré duality, vector bundles, connections and curvature, and the book ends with the general Gauss-Bonnet theorem. The text includes well over 150 exercises, and gives the background to the modern developments in gauge theory and geometry in four dimensions, but it also serves as an introductory course in algebraic topology. It will be invaluable to anyone studying cohomology, curvature, and their applications.
Contents
1. Introduction; 2. The alternating algebra; 3. De Rham cohomology; 4. Chain complexes and their cohomology; 5. The Mayer-Vietoris sequence; 6. Homotopy; 7. Applications of De Rham cohomology; 8. Smooth manifolds; 9. Differential forms on smooth manifolds; 10. Integration on manifolds; 11. Degree, linking numbers and index of vector fields; 12. The Poincaré-Hopf theorem; 13. Poincaré duality; 14. The complex projective space CPn; 15. Fiber bundles and vector bundles; 16. Operations on vector bundles and their sections; 17. Connections and curvature; 18. Characteristic classes of complex vector bundles; 19. The Euler class; 20. Cohomology of projective and Grassmanian bundles; 21. Thom isomorphism and the general Gauss-Bonnet formula.
