Articulo
Milnor fibers and symplectic fillings of quotient surface singularities
Fecha
2018Registro en:
1150068
WOS:000431089100029
Institución
Resumen
We determine a one-to-one correspondence between Milnor fibers and minimal symplectic fillings of a quotient surface singularity (up to diffeomorphism type) by giving an explicit algorithm to compare them mainly via techniques from the minimal model program for 3-folds and Pinkham's negative weight smoothing. As by-products, we show that: - Milnor fibers associated to irreducible components of the reduced versal deformation space of a quotient surface singularity are not diffeomorphic to each other with a few obvious exceptions. For this, we classify minimal symplectic fillings of a quotient surface singularity up to diffeomorphism. - Any symplectic filling of a quotient surface singularity is obtained by a sequence of rational blow-downs from a special resolution (so-called the maximal resolution) of the singularity, which is an analogue of the one-to-one correspondence between the irreducible components of the reduced versal deformation space and the so-called P-resolutions of a quotient surface singularity. (C) 2018 Elsevier Inc. All rights reserved. Keywords. Author Keywords:Milnor fiber Quotient surface singularity Symplectic filling