Explicit Estimates for the Number of Rational Points of Singular Complete Intersections over a Finite Field

Abstract

Let V⊂Pn(F-0.7mm q) be a complete intersection defined over a finite field F-0.7mm q of dimension r and singular locus of dimension at most 0 s r-2. We obtain an explicit version of the Hooley--Katz estimate ||V(F-0.7mm q)|-pr|=O(q(r+s+1)/2), where |V(F-0.7mm q)| denotes the number of F-0.7mm q-rational points of V and pr:=|Pr(F-0.7mm q)|. Our estimate improves all the previous estimates in several important cases. Our approach relies on tools of classical algebraic geometry. A crucial ingredient is a new effective version of the Bertini smoothness theorem, namely an explicit upper bound of the degree of a proper Zariski closed subset of ( Pn)s+1(F-0.7mm q) which contains all the singular linear sections of V of codimension s+1.