Riemann-Hilbert correspondence for unit F-crystals on embeddable algebraic varieties

Abstract

For a separated scheme X of finite type over a perfect field k of characteristic p>0 which admits an immersion into a proper smooth scheme over the truncated Witt ring Wn, we define the bounded derived category of locally finitely generated unit F-crystals with finite Tor-dimension on X over Wn, independently of the choice of the immersion. Then we prove the anti-equivalence of this category with the bounded derived category of constructible \'etale sheaves of Z/pn Z-modules with finite Tor dimension. We also discuss the relationship of t-structures on these derived categories when n=1. Our result is a generalization of the Riemann-Hilbert correspondence for unit F-crystals due to Emerton-Kisin to the case of (possibly singular) embeddable algebraic varieties in characteristic p>0.