The Hodge realization functor on the derived category of relative motives

Abstract

We give, for a complex algebraic variety S, a Hodge realization functor FSHdg from the derived category of constructible motives DAc(S) to the derived category D(MHM(S)) of algebraic mixed Hodge modules over S. Moreover, for f:T S a morphism of complex quasi-projective algebraic varieties, F-Hdg commutes with the four operation f*,f*,f!,f! on DAc(-) and D(MHM(-)), making the Hodge realization functor a morphism of 2-functor wich for a given S sends DAc(S) to D(MHM(S), moreover FSHdg commutes with tensor product. We also give an algebraic and analytic Gauss-Manin realization functor from which we obtain a base change theorem for algebraic De Rham cohomology and for all smooth morphisms a realtive version of the comparaison theorem of Grothendieck between the algebaric De Rham cohomology and the analytic De Rham cohomology.