A Note on Hodge theoretic anabelian geometry
Abstract
Grothendieck's anabelian conjectures predict that certain classes of varieties over number fields are largely determined by their {\'e}tale fundamental groups. A theorem of Mochizuki shows that for hyperbolic curves over number fields or -adic fields, dominant morphisms bijectively correspond to open homomorphisms between their {\'e}tale fundamental groups. Motivated by non-abelian Hodge theory, we formulate a Hodge-theoretic version of the anabelian conjecture in which the Galois action is replaced by the natural -action on the pro-algebraic completion of the fundamental group arising from non-abelian Hodge theory. In particular, we prove a Hodge-theoretic analog of Mochizuki's theorem for smooth projective hyperbolic curves over . We also obtain a higher-dimensional analogue for complex hyperbolic manifolds of ball quotient type and discuss possible extensions to non- spaces replacing fundamental groups by homotopy types.
Cite
@article{arxiv.2603.05968,
title = {A Note on Hodge theoretic anabelian geometry},
author = {Qixiang Wang},
journal= {arXiv preprint arXiv:2603.05968},
year = {2026}
}