The integral Hodge polygon for $p$-divisible groups with endomorphism structure
Abstract
Let be a prime number, let be the ring of integers of a finite field extension of and let be a complete valuation ring of rank and mixed characteristic . We introduce and study the "integral Hodge polygon", a new invariant of -divisible groups over endowed with an action of . If is unramified, this invariant recovers the classical Hodge polygon and only depends on the reduction of to the residue field of . This is not the case in general, whence the attribute "integral". The new polygon lies between Fargues' Harder-Narasimhan polygons of the -power torsion parts of and another combinatorial invariant of called the Pappas-Rapoport polygon. Furthermore, the integral Hodge polygon behaves continuously in families over a -adic analytic space.
Cite
@article{arxiv.2303.06166,
title = {The integral Hodge polygon for $p$-divisible groups with endomorphism structure},
author = {Stéphane Bijakowski and Andrea Marrama},
journal= {arXiv preprint arXiv:2303.06166},
year = {2024}
}
Comments
Slight differences from the published version