Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2013 |
| Outros Autores: | , |
| Tipo de documento: | Artigo |
| Idioma: | eng |
| Título da fonte: | Repositório Institucional da UNESP |
| Texto Completo: | http://www.rc.unesp.br/igce/matematica/rpsilva/pre-prints/pre-prints/Pre-print_files/ECRizziolliRevised17-05-2012.pdf http://hdl.handle.net/11449/75331 |
Resumo: | In this article, we investigate the geometry of quasi homogeneous corank one finitely determined map germs from (ℂn+1, 0) to (ℂn, 0) with n = 2, 3. We give a complete description, in terms of the weights and degrees, of the invariants that are associated to all stable singularities which appear in the discriminant of such map germs. The first class of invariants which we study are the isolated singularities, called 0-stable singularities because they are the 0-dimensional singularities. First, we give a formula to compute the number of An points which appear in any stable deformation of a quasi homogeneous co-rank one map germ from (ℂn+1, 0) to (ℂn, 0) with n = 2, 3. To get such a formula, we apply the Hilbert's syzygy theorem to determine the graded free resolution given by the syzygy modules of the associated iterated Jacobian ideal. Then we show how to obtain the other 0-stable singularities, these isolated singularities are formed by multiple points and here we use the relation among them and the Fitting ideals of the discriminant. For n = 2, there exists only the germ of double points set and for n = 3 there are the triple points, named points A1,1,1 and the normal crossing between a germ of a cuspidal edge and a germ of a plane, named A2,1. For n = 3, there appear also the one-dimensional singularities, which are of two types: germs of cuspidal edges or germs of double points curves. For these singularities, we show how to compute the polar multiplicities and also the local Euler obstruction at the origin in terms of the weights and degrees. © 2013 Pushpa Publishing House. |
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Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3Geometry of quasi homogeneous map germsInvariants of stable singularitiesIn this article, we investigate the geometry of quasi homogeneous corank one finitely determined map germs from (ℂn+1, 0) to (ℂn, 0) with n = 2, 3. We give a complete description, in terms of the weights and degrees, of the invariants that are associated to all stable singularities which appear in the discriminant of such map germs. The first class of invariants which we study are the isolated singularities, called 0-stable singularities because they are the 0-dimensional singularities. First, we give a formula to compute the number of An points which appear in any stable deformation of a quasi homogeneous co-rank one map germ from (ℂn+1, 0) to (ℂn, 0) with n = 2, 3. To get such a formula, we apply the Hilbert's syzygy theorem to determine the graded free resolution given by the syzygy modules of the associated iterated Jacobian ideal. Then we show how to obtain the other 0-stable singularities, these isolated singularities are formed by multiple points and here we use the relation among them and the Fitting ideals of the discriminant. For n = 2, there exists only the germ of double points set and for n = 3 there are the triple points, named points A1,1,1 and the normal crossing between a germ of a cuspidal edge and a germ of a plane, named A2,1. For n = 3, there appear also the one-dimensional singularities, which are of two types: germs of cuspidal edges or germs of double points curves. For these singularities, we show how to compute the polar multiplicities and also the local Euler obstruction at the origin in terms of the weights and degrees. © 2013 Pushpa Publishing House.Departamento de Ciências Exatas Universidade Federal de Alfenas, Campus Alfenas, Rua Gabriel Monteiro da Silva, n: 700, 37130-000, Alfenas, M.GDepartamento de Matemática Instituto de Geociências e Ciências Exatas Universidade Estadual Paulista 'Júlio Mesquita Filho', Campus de Rio Claro, Caixa Postal 178, 13506-700 Rio Claro SPDepartamento de Matemática Instituto de Ciências Matemáticas e de Computação Universidade de São Paulo - Campus de São Carlos, Caixa Postal 668, 13560-970 São Carlos SPDepartamento de Matemática Instituto de Geociências e Ciências Exatas Universidade Estadual Paulista 'Júlio Mesquita Filho', Campus de Rio Claro, Caixa Postal 178, 13506-700 Rio Claro SPUniversidade Federal de Alfenas (UNIFAL)Universidade Estadual Paulista (Unesp)Universidade de São Paulo (USP)Miranda, A. J.Rizziolli, E. C. [UNESP]Sala, M. J.2014-05-27T11:29:05Z2014-05-27T11:29:05Z2013-05-01info:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/article189-222http://www.rc.unesp.br/igce/matematica/rpsilva/pre-prints/pre-prints/Pre-print_files/ECRizziolliRevised17-05-2012.pdfJP Journal of Geometry and Topology, v. 13, n. 2, p. 189-222, 2013.0972-415Xhttp://hdl.handle.net/11449/753312-s2.0-848789755559873188602749310Scopusreponame:Repositório Institucional da UNESPinstname:Universidade Estadual Paulista (UNESP)instacron:UNESPengJP Journal of Geometry and Topologyinfo:eu-repo/semantics/openAccess2021-10-22T17:11:22Zoai:repositorio.unesp.br:11449/75331Repositório InstitucionalPUBhttp://repositorio.unesp.br/oai/requestopendoar:29462024-08-05T21:05:04.535713Repositório Institucional da UNESP - Universidade Estadual Paulista (UNESP)false |
| dc.title.none.fl_str_mv |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| title |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| spellingShingle |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 Miranda, A. J. Geometry of quasi homogeneous map germs Invariants of stable singularities |
| title_short |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| title_full |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| title_fullStr |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| title_full_unstemmed |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| title_sort |
Stable singularities of co-rank one quasi homogeneous map germs from (ℂn+1, 0) to (ℂn, 0), n = 2, 3 |
| author |
Miranda, A. J. |
| author_facet |
Miranda, A. J. Rizziolli, E. C. [UNESP] Sala, M. J. |
| author_role |
author |
| author2 |
Rizziolli, E. C. [UNESP] Sala, M. J. |
| author2_role |
author author |
| dc.contributor.none.fl_str_mv |
Universidade Federal de Alfenas (UNIFAL) Universidade Estadual Paulista (Unesp) Universidade de São Paulo (USP) |
| dc.contributor.author.fl_str_mv |
Miranda, A. J. Rizziolli, E. C. [UNESP] Sala, M. J. |
| dc.subject.por.fl_str_mv |
Geometry of quasi homogeneous map germs Invariants of stable singularities |
| topic |
Geometry of quasi homogeneous map germs Invariants of stable singularities |
| description |
In this article, we investigate the geometry of quasi homogeneous corank one finitely determined map germs from (ℂn+1, 0) to (ℂn, 0) with n = 2, 3. We give a complete description, in terms of the weights and degrees, of the invariants that are associated to all stable singularities which appear in the discriminant of such map germs. The first class of invariants which we study are the isolated singularities, called 0-stable singularities because they are the 0-dimensional singularities. First, we give a formula to compute the number of An points which appear in any stable deformation of a quasi homogeneous co-rank one map germ from (ℂn+1, 0) to (ℂn, 0) with n = 2, 3. To get such a formula, we apply the Hilbert's syzygy theorem to determine the graded free resolution given by the syzygy modules of the associated iterated Jacobian ideal. Then we show how to obtain the other 0-stable singularities, these isolated singularities are formed by multiple points and here we use the relation among them and the Fitting ideals of the discriminant. For n = 2, there exists only the germ of double points set and for n = 3 there are the triple points, named points A1,1,1 and the normal crossing between a germ of a cuspidal edge and a germ of a plane, named A2,1. For n = 3, there appear also the one-dimensional singularities, which are of two types: germs of cuspidal edges or germs of double points curves. For these singularities, we show how to compute the polar multiplicities and also the local Euler obstruction at the origin in terms of the weights and degrees. © 2013 Pushpa Publishing House. |
| publishDate |
2013 |
| dc.date.none.fl_str_mv |
2013-05-01 2014-05-27T11:29:05Z 2014-05-27T11:29:05Z |
| dc.type.status.fl_str_mv |
info:eu-repo/semantics/publishedVersion |
| dc.type.driver.fl_str_mv |
info:eu-repo/semantics/article |
| format |
article |
| status_str |
publishedVersion |
| dc.identifier.uri.fl_str_mv |
http://www.rc.unesp.br/igce/matematica/rpsilva/pre-prints/pre-prints/Pre-print_files/ECRizziolliRevised17-05-2012.pdf JP Journal of Geometry and Topology, v. 13, n. 2, p. 189-222, 2013. 0972-415X http://hdl.handle.net/11449/75331 2-s2.0-84878975555 9873188602749310 |
| url |
http://www.rc.unesp.br/igce/matematica/rpsilva/pre-prints/pre-prints/Pre-print_files/ECRizziolliRevised17-05-2012.pdf http://hdl.handle.net/11449/75331 |
| identifier_str_mv |
JP Journal of Geometry and Topology, v. 13, n. 2, p. 189-222, 2013. 0972-415X 2-s2.0-84878975555 9873188602749310 |
| dc.language.iso.fl_str_mv |
eng |
| language |
eng |
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JP Journal of Geometry and Topology |
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info:eu-repo/semantics/openAccess |
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openAccess |
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189-222 |
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Scopus reponame:Repositório Institucional da UNESP instname:Universidade Estadual Paulista (UNESP) instacron:UNESP |
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Universidade Estadual Paulista (UNESP) |
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UNESP |
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UNESP |
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Repositório Institucional da UNESP |
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Repositório Institucional da UNESP - Universidade Estadual Paulista (UNESP) |
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1808129281735262208 |