A geometric definition of Gabrielov numbers

Abstract

Gabrielov numbers describe certain Coxeter-Dynkin diagrams of the 14 exceptional unimodal singularities and play a role in Arnold's strange duality. In a previous paper, the authors defined Gabrielov numbers of a cusp singularity with an action of a finite abelian subgroup G of SL(3,) using the Gabrielov numbers of the cusp singularity and data of the group G. Here we consider a crepant resolution Y 3/G and the preimage Z of the image of the Milnor fibre of the cusp singularity under the natural projection 3 3/G. Using the McKay correspondence, we compute the homology of the pair (Y,Z). We construct a basis of the relative homology group H3(Y,Z;) with a Coxeter-Dynkin diagram where one can read off the Gabrielov numbers.