Traverso's Isogeny Conjecture for Some Unitary p-Divisible Groups

Abstract

The isogeny cutoff of a p-divisible group X (defined over an algebraically closed field of characteristic p) measures the amount of p-torsion necessary to determine its isogeny class. The minimal height of X measures its distance to the closest minimal p-divisible group (in the sense of Oort). In this paper, we study these invariants for supersingular unitary p-divisible groups of signature (a,b). We provide a complete description of the possible minimal heights. As an application, we establish bounds on the isogeny cutoffs for these p-divisible groups. Finally, we rephrase our results in the language of the BTm stratifications of unitary Shimura varieties of signature (a,b).