On open algebraic surfaces of general type whose log canonical maps composed of a pencil

Abstract

Let (S,D) be a minimal log pair of general type with S a smooth projective surface and D a simple normal corssing reduced divisor on S. We assume that its log canonial linear system |KS+D| is composed of a penciel, let f S B be the fiberation induced by the linear system |KS+D| and F be a general fiber of f. Let b (resp. g) be the genus of the base curve B (resp. general fiber F) and k=D· F the intersection number. We show that 1. If k>0 and b≥ 2 then 2≤ g+k ≤ 3, when g+k=3 we have b=2 and h1(S,KS+D)=0. 2. Suppose pa(D)≤ 2(l+q(S))+1-h1,1(S) where l is the number of irreducible components of D, then we have g≤ 5 for pg(S,D) 0. Moreover if pg(S)=0, then we have g≤ 3.