Cell decomposition and dual boundary complexes of character varieties

Abstract

The weak geometric P=W conjecture of L. Katzarkov, A. Noll, P. Pandit, and C. Simpson asserts that for any smooth Betti moduli space MB of complex dimension d over a punctured Riemann surface, the dual boundary complex D∂MB is homotopy equivalent to a (d-1)-dimensional sphere. Here, we consider MB as a generic GLn(C)-character variety defined on a Riemann surface of genus g, with local monodromies specified by generic semisimple conjugacy classes at k punctures. In this article, we establish the weak geometric P=W conjecture for all very generic MB in the sense that at least one conjugacy class is regular semisimple. A crucial step is to establish a stronger form of A. Mellit's cell decomposition theorem, i.e. we decompose MB (without passing to a vector bundle) into locally closed subvarieties of the form (C×)d-2b×A, where A is stably isomorphic to Cb. A second ingredient involves a motivic characterization of the integral cohomology of dual boundary complexes developed in a subsequent article [Su24]. Following C. Simpson's strategy, the proof is now an inductive computation of the dual boundary complexes from such a cell decomposition.