Equidistribution of Weierstrass points on curves over non-Archimedean fields

Abstract

We prove equidistribution of Weierstrass points on Berkovich curves. Let X be a smooth proper curve of positive genus over a complete algebraically closed non-Archimedean field K of equal characteristic zero with a non-trivial valuation. Let L be a line bundle of positive degree on X. The Weierstrass points of powers of L are equidistributed according to the Zhang-Arakelov measure on the analytification Xan. This provides a non-Archimedean analogue of a theorem of Mumford and Neeman. Along the way we provide a description of the reduction of Weierstrass points, answering a question of Eisenbud and Harris.