The Geometric P=W conjecture and Thurston's compactification

Abstract

In this paper, we use new results together with established facts about Thurston's compactification of Teichm\"uller space to address the geometric P=W conjecture for SL(2,C), which concerns projective compactifications of character varieties of closed surfaces. In particular, we construct a projective compactification of the SL(2,C)-character variety of any closed surface of genus g>1, in which the boundary divisors are toric varieties and the dual intersection complex is a sphere. A main technical step, of independent interest, is the derivation of an explicit formula for a well-known embedding of the set of isotopy classes of multicurves on a closed surface of genus g into N9g-9.