Degeneration Theorems of Connes and Feigin--Tsygan Type in Mixed Characteristic, with q-Analogues

Abstract

We prove mixed-characteristic analogues of the Connes and Feigin--Tsygan degeneration theorem. Let W=W(k) be the Witt vectors of a perfect field of characteristic p>0. For a smooth proper variety X over W, the de Rham-to- spectral sequence is split degenerate under the small-dimension hypothesis dim(X/W)<p-1. More generally, if X is smooth and proper over the ring of integers OK of a finite extension of Frac(W) with ramification index e, we prove the corresponding split degeneration under 2e dim(X/OK)<p-1. Under the same ramification hypothesis, we also prove split degeneration of the Ainf-to-TP spectral sequence. Finally, after inverting an explicit factorial, we obtain a topological q-de Rham analogue.