معرفی کتاب «Circle-Valued Morse Theory (de Gruyter Studies in Mathematics 32) (De Gruyter Studies in Mathematics)» نوشتهٔ Andrei V. Pajitnov، منتشرشده توسط نشر Saur در سال 2006. این کتاب در 4 صفحه، فرمت pdf، زبان انگلیسی ارائه شده است.
In The Early 1920s M. Morse Discovered That The Number Of Critical Points Of A Smooth Function On A Manifold Is Closely Related To The Topology Of The Manifold. This Became A Starting Point Of The Morse Theory Which Is Now One Of The Basic Parts Of Differential Topology. Circle-valued Morse Theory Originated From A Problem In Hydrodynamics Studied By S. P. Novikov In The Early 1980s. Nowadays, It Is A Constantly Growing Field Of Contemporary Mathematics With Applications And Connections To Many Geometrical Problems Such As Arnold's Conjecture In The Theory Of Lagrangian Intersections, Fibrations Of Manifolds Over The Circle, Dynamical Zeta Functions, And The Theory Of Knots And Links In The Three-dimensional Sphere. The Aim Of The Book Is To Give A Systematic Treatment Of Geometric Foundations Of The Subject And Recent Research Results. The Book Is Accessible To First Year Graduate Students Specializing In Geometry And Topology. Frontmatter -- Contents -- Preface -- Introduction -- Part 1. Morse Functions And Vector Fields On -- Manifolds -- Chapter 1. Vector Fields And C0 Topology -- Chapter 2. Morse Functions And Their -- Gradients -- Chapter 3. Gradient Flows Of Real-valued Morse -- Functions -- Part 2. Transversality, Handles, Morse -- Complexes -- Chapter 4. The Kupka-smale Transversality Theory -- For Gradient Flows -- Chapter 5. Handles -- Chapter 6. The Morse Complex Of A Morse -- Function -- Part 3. Cellular Gradients -- Chapter 7. Condition (c) -- Chapter 8. Cellular Gradients Are -- C0-generic -- Chapter 9. Properties Of Cellular Gradients -- Part 4. Circle-valued Morse Maps And Novikov -- Complexes -- Chapter 10. Completions Of Rings, Modules And -- Complexes -- Chapter 11. The Novikov Complex Of A Circle-valued -- Morse Map -- Chapter 12. Cellular Gradients Of Circle-valued -- Morse Functions And The Rationality Theorem -- Chapter 13. Counting Closed Orbits Of The Gradient -- Flow -- Chapter 14. Selected Topics In The Morse-novikov -- Theory -- Backmatter Andrei V. Pajitnov. Includes Bibliographical References (p. [437]-444) And Index.
In the early 1920s M. Morse discovered that the number of critical points of a smooth function on a manifold is closely related to the topology of the manifold. This became a starting point of the Morse theory which is now one of the basic parts of differential topology.
Circle-valued Morse theory originated from a problem in hydrodynamics studied by S. P. Novikov in the early 1980s. Nowadays, it is a constantly growing field of contemporary mathematics with applications and connections to many geometrical problems such as Arnold's conjecture in the theory of Lagrangian intersections, fibrations of manifolds over the circle, dynamical zeta functions, and the theory of knots and links in the three-dimensional sphere.
The aim of the book is to give a systematic treatment of geometric foundations of the subject and recent research results. The book is accessible to first year graduate students specializing in geometry and topology.
In 1927, M Morse discovered that the number of critical points of a smooth function on a manifold is closely related to the topology of the manifold. This became a starting point of the Morse theory. This book aims to give a systematic treatment of the geometric foundations of a subfield of that topic, the circle-valued Morse functions Morse discovered that the number of critical points of a smooth function on a manifold is closely related to the topology of the manifold. The aim of the present book is to give a systematic treatment of the geometric foundations of a subfield of that topic, the circle-valued Morse functions, a subfield of Morse theory.