Add to ORKGIn this note, we give a proof of the famous theorem of M. Morse dealing with the cancellation of a pair of non-degenerate critical points of a smooth function. Our proof consists of a reduction to the one-dimensional case where the question becomes easy to answer
Abstract. The ambient framed bordism class of the connecting mani-fold of two consecutive critical p...
The Morse Theory of critical points was extended by Palais and Smale to a certain class of functions...
The Morse Theory of critical points was extended by Palais and Smale to a certain class of functions...
Morse theory is an extremely versatile tool, useful in a variety of situations and parts of topology...
AbstractIt is often said that the Morse-Bott Lemma can be viewed as a “parameterized” Morse Lemma, a...
In this paper we prove a Morse Lemma for degenerate critical points of a function u which satisfies ...
Conselho Nacional de Desenvolvimento Científico e Tecnológico (CNPq)Fundação de Amparo à Pesquisa do...
Abstract. Based on Morse homology of Morse functions, we give a new proof of the Morse–Bott inequali...
Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP)Conselho Nacional de Desenvolvimento Ci...
Morse theory, a study in the intersection of differential geometry and algebraic topology, examines ...
AbstractIn this paper we prove the Morse inequalities in the non-degenerate and degenerate cases. Li...
Based on Morse homology of Morse functions, we give a new proof of the Morse-Bott inequalities for f...
It is a consequence of the Morse–Bott Lemma (see Theorems 2.10 and 2.14) that a C^2 Morse–Bott funct...
The aim of this paper is to study the notion of critical element of a proper discrete Morse function...
Many questions in mathematics and physics can be reduced to the problem of finding and classifying t...
Abstract. The ambient framed bordism class of the connecting mani-fold of two consecutive critical p...
The Morse Theory of critical points was extended by Palais and Smale to a certain class of functions...
The Morse Theory of critical points was extended by Palais and Smale to a certain class of functions...
Morse theory is an extremely versatile tool, useful in a variety of situations and parts of topology...
AbstractIt is often said that the Morse-Bott Lemma can be viewed as a “parameterized” Morse Lemma, a...
In this paper we prove a Morse Lemma for degenerate critical points of a function u which satisfies ...
Conselho Nacional de Desenvolvimento Científico e Tecnológico (CNPq)Fundação de Amparo à Pesquisa do...
Abstract. Based on Morse homology of Morse functions, we give a new proof of the Morse–Bott inequali...
Fundação de Amparo à Pesquisa do Estado de São Paulo (FAPESP)Conselho Nacional de Desenvolvimento Ci...
Morse theory, a study in the intersection of differential geometry and algebraic topology, examines ...
AbstractIn this paper we prove the Morse inequalities in the non-degenerate and degenerate cases. Li...
Based on Morse homology of Morse functions, we give a new proof of the Morse-Bott inequalities for f...
It is a consequence of the Morse–Bott Lemma (see Theorems 2.10 and 2.14) that a C^2 Morse–Bott funct...
The aim of this paper is to study the notion of critical element of a proper discrete Morse function...
Many questions in mathematics and physics can be reduced to the problem of finding and classifying t...
Abstract. The ambient framed bordism class of the connecting mani-fold of two consecutive critical p...
The Morse Theory of critical points was extended by Palais and Smale to a certain class of functions...
The Morse Theory of critical points was extended by Palais and Smale to a certain class of functions...