Add to ORKGMorse theory is a study of deep connections between analysis and topology. In its classical form, it provides a relationship between the critical points of certain smooth functions on a manifold and the topology of the manifold. It has been used by geometers, topologists, physicists, and others as a remarkably effective tool to study manifolds. In the 1980s and 1990s, Morse theory was extended to infinite dimensions with great success. This book is Morse's own exposition of his ideas. It has been called one of the most important and influential mathematical works of the twentieth century. Cal
Morse homology studies the topology of smooth manifolds by examining the critical points of a real-v...
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
In this work we present a study of Morse theory with the aim of introducing the Morse homology theor...
In a very broad sense, '"spaces" are the primary objects of study in geometry, and "functions" are t...
Morse theory is an extremely versatile tool, useful in a variety of situations and parts of topology...
Classical Morse Theory [8] considers the topological changes of the level sets Mh = { x ∈ M | f(x) ...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
Ph.D.MathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue....
During the last century, global analysis was one of the main sources of interaction between geometry...
This study will mainly concentrate on Morse Theory. Morse Theory is the study of the relations betwe...
This chapter discusses the Morse theory for Hamiltonian systems. The chapter presents the differenti...
Morse theory, a study in the intersection of differential geometry and algebraic topology, examines ...
Morse theory is an extremely versatile tool, useful in a variety of situations and parts of topology...
Classical Morse theory connects the topology of a manifold with critical points of a Morse function....
Appendix by Umberto HryniewiczThis is a survey paper on Morse theory and the existence problem for c...
Morse homology studies the topology of smooth manifolds by examining the critical points of a real-v...
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
In this work we present a study of Morse theory with the aim of introducing the Morse homology theor...
In a very broad sense, '"spaces" are the primary objects of study in geometry, and "functions" are t...
Morse theory is an extremely versatile tool, useful in a variety of situations and parts of topology...
Classical Morse Theory [8] considers the topological changes of the level sets Mh = { x ∈ M | f(x) ...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
Ph.D.MathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue....
During the last century, global analysis was one of the main sources of interaction between geometry...
This study will mainly concentrate on Morse Theory. Morse Theory is the study of the relations betwe...
This chapter discusses the Morse theory for Hamiltonian systems. The chapter presents the differenti...
Morse theory, a study in the intersection of differential geometry and algebraic topology, examines ...
Morse theory is an extremely versatile tool, useful in a variety of situations and parts of topology...
Classical Morse theory connects the topology of a manifold with critical points of a Morse function....
Appendix by Umberto HryniewiczThis is a survey paper on Morse theory and the existence problem for c...
Morse homology studies the topology of smooth manifolds by examining the critical points of a real-v...
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
In this work we present a study of Morse theory with the aim of introducing the Morse homology theor...