Non-archimedean topological mirror symmetry for SLn and PGLn Higgs bundles

Abstract

The Hausel-Thaddeus conjectures concern topological mirror symmetry between moduli spaces of SLn and PGLn Higgs bundles on a curve. A non-archimedean approach was introduced by Groechenig, Wyss and Ziegler, proving the conjecture for coprime rank and degree. This article is concerned with its generalisation to the non-coprime case. We treat both the classical (D=K) and meromorphic (D>K) settings. We prove an equality of p-adic volumes twisted by gerbes between moduli spaces of SLn and PGLn Higgs bundles of arbitrary degree. In the meromorphic case, building on results of Maulik and Shen, we show that these twisted p-adic volumes are related to intersection cohomology. We also conjecture a connection between these p-adic volumes and BPS cohomology.