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The present paper gives an account and quantifies the change in topology induced by small and type II geometric transitions, by introducing the notion of the homological type of a geometric transition. The obtained results agree with, and go further than, most results and estimates, given to date by several authors, both in mathematical and physical literature.

Rossi, M. (2011). Homological type of geometric transitions. GEOMETRIAE DEDICATA, 151(1), 323-359 [10.1007/s10711-010-9537-0].

Homological type of geometric transitions

Rossi, M
2011

Abstract

The present paper gives an account and quantifies the change in topology induced by small and type II geometric transitions, by introducing the notion of the homological type of a geometric transition. The obtained results agree with, and go further than, most results and estimates, given to date by several authors, both in mathematical and physical literature.
Articolo in rivista - Articolo scientifico
https://www.scopus.com/record/display.uri?eid=2-s2.0-79952739691&origin=inward&txGid=4281bddb7e28cfb464b924d4c5e01526#:~:text=Black hole condensation; Calabi Yau threefolds; Conifold transitions; Geometric transitions; Resolution of isolated singularities; Smoothing isolated singularities; Vacuum degeneracy
English
2-ott-2010
2011
151
1
323
359
none
Rossi, M. (2011). Homological type of geometric transitions. GEOMETRIAE DEDICATA, 151(1), 323-359 [10.1007/s10711-010-9537-0].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/404949
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