Degeneration of families of projective hypersurfaces and Hodge conjecture

Abstract

We prove by induction on dimension the Hodge conjecture for smooth complex projective varieties. Let X be a smooth complex projective variety. Then X is birational to a possibly singular projective hypersurface, hence to a smooth projective variety E0 which is a component of a normal crossing divisor E=i=0rEi⊂ Y which is the singular fiber of a pencil f:Y A1 of smooth projective hypersurfaces. Using the smooth hypersurface case by a previous result of the autor, the nearby cycle functor on mixed Hodge module with rational de Rham factor, and the induction hypothesis, we prove that an Hodge class of E0 is absolute Hodge, more precisely the locus of Hodge classes inside the algebraic vector bundle given the De Rham cohomology the rational deformation of E0 is defined over Q. By another previous result of the autor, we get the Hodge conjecture for E0. By the induction hypothesis we also have the Hodge conjecture for X.