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Picard-Fuchs equations and special geometry
We investigate the system of holomorphic differential identities implied by special K\"ahlerian geometry of four-dimensional N=2 supergravity. For superstring compactifications on \cy threefolds these identities are equivalent to the Picard-Fuchs equations of algebraic geometry that are obeyed...
| Autores principales: | , , , , |
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| Lenguaje: | eng |
| Publicado: |
1993
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1142/S0217751X93000047 http://cds.cern.ch/record/235818 |
| _version_ | 1780884621870759936 |
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| author | Ceresole, Anna D'Auria, R. Ferrara, S. Lerche, W. Louis, J. |
| author_facet | Ceresole, Anna D'Auria, R. Ferrara, S. Lerche, W. Louis, J. |
| author_sort | Ceresole, Anna |
| collection | CERN |
| description | We investigate the system of holomorphic differential identities implied by special K\"ahlerian geometry of four-dimensional N=2 supergravity. For superstring compactifications on \cy threefolds these identities are equivalent to the Picard-Fuchs equations of algebraic geometry that are obeyed by the periods of the holomorphic three-form. For one variable they reduce to linear fourth-order equations which are characterized by classical $W$-generators; we find that the instanton corrections to the Yukawa couplings are directly related to the non-vanishing of $w_4$. We also show that the symplectic structure of special geometry can be related to the fact that the Yukawa couplings can be written as triple derivatives of some holomorphic function $F$. Moreover, we give the precise relationship of the Yukawa couplings of special geometry with three-point functions in topological field theory. |
| id | cern-235818 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1993 |
| record_format | invenio |
| spelling | cern-2358182023-03-14T19:59:01Zdoi:10.1142/S0217751X93000047http://cds.cern.ch/record/235818engCeresole, AnnaD'Auria, R.Ferrara, S.Lerche, W.Louis, J.Picard-Fuchs equations and special geometryGeneral Theoretical PhysicsWe investigate the system of holomorphic differential identities implied by special K\"ahlerian geometry of four-dimensional N=2 supergravity. For superstring compactifications on \cy threefolds these identities are equivalent to the Picard-Fuchs equations of algebraic geometry that are obeyed by the periods of the holomorphic three-form. For one variable they reduce to linear fourth-order equations which are characterized by classical $W$-generators; we find that the instanton corrections to the Yukawa couplings are directly related to the non-vanishing of $w_4$. We also show that the symplectic structure of special geometry can be related to the fact that the Yukawa couplings can be written as triple derivatives of some holomorphic function $F$. Moreover, we give the precise relationship of the Yukawa couplings of special geometry with three-point functions in topological field theory.We investigate the system of holomorphic differential identities implied by special K\"ahlerian geometry of four--dimensional $N=2$ supergravity. For superstring compactifications on \cy\ threefolds these identities are equivalent to the Picard--Fuchs equations of algebraic geometry that are obeyed by the periods of the holomorphic three--form. For one variable they reduce to linear fourth--order equations which are characterized by classical $W$--generators; we find that the instanton corrections to the Yukawa couplings are directly related to the non--vanishing of $w_4$. We also show that the symplectic structure of special geometry can be related to the fact that the Yukawa couplings can be written as triple derivatives of some holomorphic function $F$. Moreover, we give the precise relationship of the Yukawa couplings of special geometry with three--point functions in topological field theory.We investigate the system of holomorphic differential identities implied by special K\"ahlerian geometry of four--dimensional $N=2$ supergravity. For superstring compactifications on \cy\ threefolds these identities are equivalent to the Picard--Fuchs equations of algebraic geometry that are obeyed by the periods of the holomorphic three--form. For one variable they reduce to linear fourth--order equations which are characterized by classical $W$--generators; we find that the instanton corrections to the Yukawa couplings are directly related to the non--vanishing of $w_4$. We also show that the symplectic structure of special geometry can be related to the fact that the Yukawa couplings can be written as triple derivatives of some holomorphic function $F$. Moreover, we give the precise relationship of the Yukawa couplings of special geometry with three--point functions in topological field theory.We investigate the system of holomorphic differential identities implied by special K\"ahlerian geometry of four-dimensional N=2 supergravity. For superstring compactifications on \cy threefolds these identities are equivalent to the Picard-Fuchs equations of algebraic geometry that are obeyed by the periods of the holomorphic three-form. For one variable they reduce to linear fourth-order equations which are characterized by classical $W$-generators; we find that the instanton corrections to the Yukawa couplings are directly related to the non-vanishing of $w_4$. We also show that the symplectic structure of special geometry can be related to the fact that the Yukawa couplings can be written as triple derivatives of some holomorphic function $F$. Moreover, we give the precise relationship of the Yukawa couplings of special geometry with three-point functions in topological field theory.hep-th/9204035CERN-TH-6441-92UCLA-92-TEP-8CALT-68-1776POLFIS-TH-08-92CALT-68-1776CERN-TH-6441-92POLFIS-TH-92-8UCLA-92-TEP-8oai:cds.cern.ch:2358181993 |
| spellingShingle | General Theoretical Physics Ceresole, Anna D'Auria, R. Ferrara, S. Lerche, W. Louis, J. Picard-Fuchs equations and special geometry |
| title | Picard-Fuchs equations and special geometry |
| title_full | Picard-Fuchs equations and special geometry |
| title_fullStr | Picard-Fuchs equations and special geometry |
| title_full_unstemmed | Picard-Fuchs equations and special geometry |
| title_short | Picard-Fuchs equations and special geometry |
| title_sort | picard-fuchs equations and special geometry |
| topic | General Theoretical Physics |
| url | https://dx.doi.org/10.1142/S0217751X93000047 http://cds.cern.ch/record/235818 |
| work_keys_str_mv | AT ceresoleanna picardfuchsequationsandspecialgeometry AT dauriar picardfuchsequationsandspecialgeometry AT ferraras picardfuchsequationsandspecialgeometry AT lerchew picardfuchsequationsandspecialgeometry AT louisj picardfuchsequationsandspecialgeometry |