Cantitate/Preț
Produs

Modern Geometry—Methods and Applications: Part III: Introduction to Homology Theory: Graduate Texts in Mathematics, cartea 124

Autor B.A. Dubrovin Traducere de Robert G. Burns Autor A. T. Fomenko, S.P. Novikov
en Limba Engleză Hardback – 18 oct 1990
Over the past fifteen years, the geometrical and topological methods of the theory of manifolds have as- sumed a central role in the most advanced areas of pure and applied mathematics as well as theoretical physics. The three volumes of Modern Geometry - Methods and Applications contain a concrete exposition of these methods together with their main applications in mathematics and physics. This third volume, presented in highly accessible languages, concentrates in homology theory. It contains introductions to the contemporary methods for the calculation of homology groups and the classification of manifesto. Both scientists and students of mathematics as well as theoretical physics will find this book to be a valuable reference and text.
Citește tot Restrânge

Toate formatele și edițiile

Toate formatele și edițiile Preț Express
Paperback (1) 45312 lei  6-8 săpt.
  Springer – 23 dec 2011 45312 lei  6-8 săpt.
Hardback (1) 52952 lei  6-8 săpt.
  Springer – 18 oct 1990 52952 lei  6-8 săpt.

Din seria Graduate Texts in Mathematics

Preț: 52952 lei

Preț vechi: 62295 lei
-15% Nou

Puncte Express: 794

Preț estimativ în valută:
10137 10537$ 8405£

Carte tipărită la comandă

Livrare economică 06-20 februarie 25

Preluare comenzi: 021 569.72.76

Specificații

ISBN-13: 9780387972718
ISBN-10: 0387972714
Pagini: 418
Ilustrații: X, 418 p.
Dimensiuni: 156 x 234 x 24 mm
Greutate: 0.78 kg
Ediția:1990
Editura: Springer
Colecția Springer
Seria Graduate Texts in Mathematics

Locul publicării:New York, NY, United States

Public țintă

Lower undergraduate

Cuprins

1 Homology and Cohomology. Computational Recipes.- §1. Cohomology groups as classes of closed differential forms. Their homotopy invariance.- §2. The homology theory of algebraic complexes.- §3. Simplicial complexes. Their homology and cohomology groups. The classification of the two-dimensional closed surfaces.- §4. Attaching cells to a topological space. Cell spaces. Theorems on the reduction of cell spaces. Homology groups and the fundamental groups of surfaces and certain other manifolds.- §5. The singular homology and cohomology groups. Their homotogy invariance. The exact sequence of a pair. Relative homology groups.- §6. The singular homology of cell complexes. Its equivalence with cell homology. Poincaré duality in simplicial homology.- §7. The homology groups of a product of spaces. Multiplication in cohomology rings. The cohomology theory of H-spaces and Lie groups. The cohomology of the unitary groups.- §8. The homology theory of fibre bundles (skew products).- §9. The extension problem for maps, homotopies, and cross-sections. Obstruction cohomology classes.- §10. Homology theory and methods for computing homotopy groups. The Cartan-Serre theorem. Cohomology operations. Vector bundles.- §11. Homology theory and the fundamental group.- §12. The cohomology groups of hyperelliptic Riemann surfaces. Jacobi tori. Geodesics on multi-axis ellipsoids. Relationship to finite-gap potentials.- §13. The simplest properties of Kähler manifolds. Abelian tori.- §14. Sheaf cohomology.- 2 Critical Points of Smooth Functions and Homology Theory.- §15. Morse functions and cell complexes.- §16. The Morse inequalities.- §17. Morse-Smale functions. Handles. Surfaces.- §18. Poincaré duality.- §19. Critical points of smooth functions and theLyusternik-Shnirelman category of a manifold.- §20. Critical manifolds and the Morse inequalities. Functions with symmetry.- §21. Critical points of functionals and the topology of the path space ?(M).- §22. Applications of the index theorem.- §23. The periodic problem of the calculus of variations.- §24. Morse functions on 3-dimensional manifolds and Heegaard splittings.- §25. Unitary Bott periodicity and higher-dimensional variational problems.- §26. Morse theory and certain motions in the planar n-body problem.- 3 Cobordisms and Smooth Structures.- §27. Characteristic numbers. Cobordisms. Cycles and submanifolds. The signature of a manifold.- §28. Smooth structures on the 7-dimensional sphere. The classification problem for smooth manifolds (normal invariants). Reidemeister torsion and the fundamental hypothesis (Hauptvermutung) of combinatorial topology.- APPENDIX 1 An Analogue of Morse Theory for Many-Valued Functions. Certain Properties of Poisson Brackets.- APPENDIX 2 Plateau’s Problem. Spectral Bordisms and Globally Minimal Surfaces in Riemannian Manifolds.- Errata to Parts I and II.