TY - JOUR

T1 - A McKay correspondence for the Poincaré series of some finite subgroups of SL3(C)

AU - Ebeling, Wolfgang

N1 - Funding information: Partially supported by DFG.

PY - 2018

Y1 - 2018

N2 - A finite subgroup of SL2(C) defines a (Kleinian) rational surface singularity. The McKay correspondence yields a relation between the Poincaré series of the algebra of invariants of such a group and the characteristic polynomials of certain Coxeter elements determined by the corresponding singularity. Here we consider some non-abelian finite subgroups G of SL3(C). They define non-isolated three-dimensional Gorenstein quotient singularities. We consider suitable hyperplane sections of such singularities which are Kleinian or Fuchsian surface singularities. We show that we obtain a similar relation between the group G and the corresponding surface singularity.

AB - A finite subgroup of SL2(C) defines a (Kleinian) rational surface singularity. The McKay correspondence yields a relation between the Poincaré series of the algebra of invariants of such a group and the characteristic polynomials of certain Coxeter elements determined by the corresponding singularity. Here we consider some non-abelian finite subgroups G of SL3(C). They define non-isolated three-dimensional Gorenstein quotient singularities. We consider suitable hyperplane sections of such singularities which are Kleinian or Fuchsian surface singularities. We show that we obtain a similar relation between the group G and the corresponding surface singularity.

UR - http://www.scopus.com/inward/record.url?scp=85057084183&partnerID=8YFLogxK

U2 - 10.5427/jsing.2018.18t

DO - 10.5427/jsing.2018.18t

M3 - Article

AN - SCOPUS:85057084183

VL - 18

SP - 397

EP - 408

JO - Journal of Singularities

JF - Journal of Singularities

SN - 1949-2006

M1 - 19

ER -