Lefschetz theorems for tamely ramified coverings

Abstract

As is well known, the Lefschetz theorems for the \'etale fundamental group of SGA1 do not hold. We fill a small gap in the literature showing they do for tame coverings. Let X be a regular projective variety over a field k, and let D X be a strict normal crossings divisor. Then, if Y is an ample regular hyperplane intersecting D transversally, the restriction functor from tame \'etale coverings of X D to those of Y D Y is an equivalence if dimension X 3, and fully faithful if dimension X=2. The method is dictated by Grothendieck-Murre ("The tame fundamental group of a formal neighbourhood of a divisor with normal crossings on a scheme", Springer LNM 208). The authors showed that one can lift tame coverings from Y D Y to the complement of D Y in the formal completion of X along Y. One has then to further lift to X D.