Bounded cohomology property on a smooth projective surface with Picard number two

Abstract

We say a smooth projective surface X satisfies the bounded cohomology property if there exists a positive constant cX such that h1( OX(C)) cXh0( OX(C)) for every prime divisor C on X. Let the closed Mori cone NE(X)= R0[C1]+ R0[C2] such that C1 and C2 with C22<0 are some curves on X. If either (i) the Kodaira dimension (X)1 or (ii) (X)=2, the irregularity q(X)=0 and the Iitaka dimension (X,C1)=1, then we prove that X satisfies the bounded cohomology property.