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Dynkin graphs and quadrilateral singularities

The study of hypersurface quadrilateral singularities can be reduced to the study of elliptic K3 surfaces with a singular fiber of type I * 0 (superscript *, subscript 0), and therefore these notes consider, besides the topics of the title, such K3 surfaces too. The combinations of rational double p...

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Autor principal: Urabe, Tohsuke
Lenguaje:eng
Publicado: Springer 1993
Materias:
Acceso en línea:https://dx.doi.org/10.1007/BFb0084369
http://cds.cern.ch/record/1691545
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author Urabe, Tohsuke
author_facet Urabe, Tohsuke
author_sort Urabe, Tohsuke
collection CERN
description The study of hypersurface quadrilateral singularities can be reduced to the study of elliptic K3 surfaces with a singular fiber of type I * 0 (superscript *, subscript 0), and therefore these notes consider, besides the topics of the title, such K3 surfaces too. The combinations of rational double points that can occur on fibers in the semi-universal deformations of quadrilateral singularities are examined, to show that the possible combinations can be described by a certain law from the viewpoint of Dynkin graphs. This is equivalent to saying that the possible combinations of singular fibers in elliptic K3 surfaces with a singular fiber of type I * 0 (superscript *, subscript 0) can be described by a certain law using classical Dynkin graphs appearing in the theory of semi-simple Lie groups. Further, a similar description for thecombination of singularities on plane sextic curves is given. Standard knowledge of algebraic geometry at the level of graduate students is expected. A new method based on graphs will attract attention of researches.
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spelling cern-16915452021-04-21T21:09:03Zdoi:10.1007/BFb0084369http://cds.cern.ch/record/1691545engUrabe, TohsukeDynkin graphs and quadrilateral singularitiesMathematical Physics and MathematicsThe study of hypersurface quadrilateral singularities can be reduced to the study of elliptic K3 surfaces with a singular fiber of type I * 0 (superscript *, subscript 0), and therefore these notes consider, besides the topics of the title, such K3 surfaces too. The combinations of rational double points that can occur on fibers in the semi-universal deformations of quadrilateral singularities are examined, to show that the possible combinations can be described by a certain law from the viewpoint of Dynkin graphs. This is equivalent to saying that the possible combinations of singular fibers in elliptic K3 surfaces with a singular fiber of type I * 0 (superscript *, subscript 0) can be described by a certain law using classical Dynkin graphs appearing in the theory of semi-simple Lie groups. Further, a similar description for thecombination of singularities on plane sextic curves is given. Standard knowledge of algebraic geometry at the level of graduate students is expected. A new method based on graphs will attract attention of researches.Springeroai:cds.cern.ch:16915451993
spellingShingle Mathematical Physics and Mathematics
Urabe, Tohsuke
Dynkin graphs and quadrilateral singularities
title Dynkin graphs and quadrilateral singularities
title_full Dynkin graphs and quadrilateral singularities
title_fullStr Dynkin graphs and quadrilateral singularities
title_full_unstemmed Dynkin graphs and quadrilateral singularities
title_short Dynkin graphs and quadrilateral singularities
title_sort dynkin graphs and quadrilateral singularities
topic Mathematical Physics and Mathematics
url https://dx.doi.org/10.1007/BFb0084369
http://cds.cern.ch/record/1691545
work_keys_str_mv AT urabetohsuke dynkingraphsandquadrilateralsingularities