Morse Theory

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One of the most cited books in mathematics, John Milnor's exposition of Morse theory has been the most important book on the subject for more than forty years. Morse theory was developed in the 1920s by mathematician Marston Morse. (Morse was on the faculty of the Institute for Advanced Study, and Princeton published his "Topological Methods in the Theory of Functions of a Comp...

One of the most cited books in mathematics, John Milnor's exposition of Morse theory has been the most important book on the subject for more than forty years. Morse theory was developed in the 1920s by mathematician Marston Morse. (Morse was on the faculty of the Institute for Advanced Study, and Princeton published his "Topological Methods in the Theory of Functions of a Complex Variable" in the "Annals of Mathematics Studies" series in 1947.) One classical application of Morse theory includes the attempt to understand, with only limited information, the large-scale structure of an object. This kind of problem occurs in mathematical physics, dynamic systems, and mechanical engineering. Morse theory has received much attention in the last two decades as a result of a famous paper in which theoretical physicist Edward Witten relates Morse theory to quantum field theory. Milnor was awarded the Fields Medal (the mathematical equivalent of a Nobel Prize) in 1962 for his work in differential topology. He has since received the National Medal of Science (1967) and the Steele Prize from the American Mathematical Society twice (1982 and 2004) in recognition of his explanations of mathematical concepts across a wide range of scientific.c disciplines. The citation reads, "The phrase sublime elegance is rarely associated with mathematical exposition, but it applies to all of Milnor's writings. Reading his books, one is struck with the ease with which the subject is unfolding and it only becomes apparent after re.ection that this ease is the mark of a master." Milnor has published five books with Princeton University Press.

Author(s): John W.Milnor
Series: Annals of Mathematics Studies 51
Edition: latex
Publisher: Princeton University Press
Year: 1963

Language: English
Pages: 143

Preface
Non-degenerate Smooth Functions on a Manifold
Introduction
Definitions and Lemmas
Homotopy Type in Terms of Critical Values
Examples
The Morse Inequalities
Manifolds in Euclidean Space
The Lefschetz Theorem on Hyperplane Sections
A Rapid Course in Riemannian Geometry
Covariant Differentiation
The Curvature Tensor
Geodesics and Completeness
The Calculus of Variations Applied to Geodesics
The Path Space of a Smooth Manifold
The Energy of a Path
The Hessian of the Energy Function at a Critical Path
Jacobi Fields: The Null Space of E**
The Index Theorem
A Finite Dimensional Approximation to c
The Topology of the Full Path Space
Existence of Non-Conjugate Points
Some Relations Between Topology and Curvature
Applications to Lie Groups and Symmetric Spaces
Symmetric Spaces
Lie Groups as Symmetric Spaces
Whole Manifolds of Minimal Geodesics
The Bott Periodicity Theorem for the Unitary Group
The Periodicity Theorem for the Orthogonal Group
Appendix. The Homotopy Type of a Monotone Union
Bibliography