Petersen graph and monodromy of the 27 lines on the Clebsch surface
Abstract
Let G be the orbifold fundamental group of the moduli space of smooth cubic surfaces Msm in P3C with base point at the Clebsch surface X1. The image of the monodromy action G Permutations of 27 lines on X1 is famously the Weyl group of type E6. Here we give a description of this monodromy action in terms of the Petersen graph by working out the action of ten explicit generators of G by elementary calculation. These ten generators were found in joint work with Allcock and Looijenga while studying the description of Msm as a discriminant complement in a complex 4-ball quotient.
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