Difference between revisions of "Paper/Supersymmetry and Morse theory"
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It is shown that the Morse inequalities can be obtained by consideration of a certain supersymmetric quantum mechanics Hamiltonian.Some of the implications of modern ideas in mathematics for supersymmetric theories are discussed. | It is shown that the Morse inequalities can be obtained by consideration of a certain supersymmetric quantum mechanics Hamiltonian. Some of the implications of modern ideas in mathematics for supersymmetric theories are discussed. | ||
==Notes== | |||
This paper also cited a number of paper in the field of topology<ref>{{:Paper/Essays on topology and related topics}}</ref>. It also reminded me of this paper<ref>{{:Paper/Topological Shapes and Their Significance}}</ref>. | |||
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[[Category:Symmetry]] | [[Category:Symmetry]] | ||
[[Category:Symmetry breaking]] | [[Category:Symmetry breaking]] | ||
[[Category: | [[Category:Supersymmetry]] | ||
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Latest revision as of 13:41, 22 May 2022
Witten, Edward (1982). "Supersymmetry and Morse theory" (17(4)). local page: J. Differential Geom.: 661-692. doi:10.4310/jdg/1214437492.
Abstract
It is shown that the Morse inequalities can be obtained by consideration of a certain supersymmetric quantum mechanics Hamiltonian. Some of the implications of modern ideas in mathematics for supersymmetric theories are discussed.
Notes
This paper also cited a number of paper in the field of topology[1]. It also reminded me of this paper[2].
References
- ↑ Haefliger, AndrÃ; Narasimhan, Raghavan (1970). Essays on topology and related topics: Memoires dedies a Georges de Rham. local page: Springer Verlag. ISBN 978-3540048121.
- ↑ Rousan, Kazi Abu (31 May 2019). "Topological Shapes and Their Significance:Playing with Loops, Scissors and Glue." (PDF). local page: arxiv.org.