Coxeter elements for vanishing cycles of type A1/2∞ and D1/2∞

Abstract

We introduce two entire functions fA1/2∞and fD1/2∞ in two variables. Both of them have only two critical values 0 and 1, and the associated maps 2 to define topologically locally trivial fibrations over 0,1\. All critical points are ordinary double points, and the associated vanishing cycles span the middle homology group of the general fiber, whose intersection diagram forms bi-partitely decomposed quivers of type A1/2∞ and D1/2∞, respectively. Coxeter elements of type A1/2∞ and D1/2∞, acting on the middle homology group, are introduced as the product of the monodromies around 0 and 1. We describe the spectra of the Coxeter elements by embedding the middle homology group into a Hilbert space. The spectra turn out to be strongly continuous on the interval (-1/2,1/2) except at 0 for type .