Symplectic geometry of p-adic Teichm\"uller uniformization for ordinary nilpotent indigenous bundles

Abstract

The aim of the present paper is to provide a new aspect of the p-adic Teichm\"uller theory established by S. Mochizuki. We study the symplectic geometry of the p-adic formal stacks Mg, Zp (= the moduli classifying p-adic formal curves of fixed genus g>1) and Sg, Zp (= the moduli classifying p-adic formal curves of genus g equipped with an indigenous bundle). A major achievement in the (classical) p-adic Teichm\"uller theory is the construction of the locus Ng, Zpord in Sg, Zp classifying p-adic canonical liftings of ordinary nilpotent indigenous bundles. The formal stack Ng, Zpord embodies a p-adic analogue of uniformization of hyperbolic Riemann surfaces, as well as a hyperbolic analogue of Serre-Tate theory of ordinary abelian varieties. In the present paper, the canonical symplectic structure on the cotangent bundle TZp Mg, Zp of Mg, Zp is compared to Goldman's symplectic structure defined on Sg, Zp after base-change by the projection Ng, Zpord → Mg, Zp. We can think of this comparison as a p-adic analogue of certain results in the theory of projective structures on Riemann surfaces proved by S. Kawai and other mathematicians.