Lift-independence problem in the P-adic Simpson correspondence for curves

Abstract

Let X be a proper smooth rigid analytic variety over a complete algebraically closed field p-adic field C. Fix an continuation Exp of . Faltings (in the curve case) and Heuer showed that any lifting X of X over B dR+/t2 induces an equivalence bewteen the category of Higgs bundles on Xet and the category of v-bundles on Xv. In this paper, we aim to study how the equivalence depends on the choice of such a lifting X when X is a curve of genus g≥slant 2. More precisely, we call a Higgs bundle lift-independent if it always corresponds to the same v-bundle under p-adic Simpson correspondence with respect to any lifting X and then we will show that (1) There exists some r(g)≥slant g-1 such that any semistable lift-independent Hitchin-small Higgs bundle of rank r≤slant r(g) has zero Higgs field. (2) There always exists a semistable Higgs bundle of degree 0 with non-zero Higgs field that is lift-independent.