Polarized mixed Hodge structures: on irrationality of threefolds via degeneration

Sunto In questo lavoro si studia una degenerazione di varietà lisce e proiettive di dimensione tre e la degenerazione delle corrispondenti strutture di Hodge polarizzate. La polarizzazione sulla struttura di Hodge mista « limite » viene poi applicata allo studio dell'irrazionalità della generica varietà della famiglia.

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Partially supported by a C.N.R. fellowship at the University of Georgia, Athens, USA.     

The locus of Hodge classes in an admissible variation of mixed Hodge structure

We generalize the theorem of E. Cattani, P. Deligne, and A. Kaplan to admissible variations of mixed Hodge structure.     

Asymptotics of degenerations of mixed Hodge structures

We construct a hermitian metric on the classifying spaces of graded-polarized mixed Hodge structures and prove analogs of the strong distance estimate [6] between an admissible period map and the approximating nilpotent orbit. We also consider the asymptotic behavior of the biextension metric introduced by Hain [12], analogs of the norm estimates of [19] and the asymptotics of the naive limit Hodge filtration considered in [21].     

Classifying spaces for polarized mixed Hodge structures and for Brieskorn lattices

Classifying spaces and moduli spaces are constructed for two invariants of isolated hypersurface singularities, for the polarized mixed Hodge structure on the middle cohomology of the Milnor fibre, and for the Brieskorn lattice as a subspace of the Gauß–Manin connection. The relations between them, period mappings for -constant families of singularities, and Torelli theorems are discussed.     

The mixed Hodge structure on the fundamental group of a punctured Riemann surface

Given a compact Riemann surface of genus and distinct points and on , we consider the non-compact Riemann surface with basepoint . The extension of mixed Hodge structures associated to the first two steps of is studied. We show that it determines the element in , where represents the canonical divisor of as well as the corresponding extension associated to . Finally, we deduce a pointed Torelli theorem for punctured Riemann surfaces.

     

On the mixed Hodge structure on the cohomology of the Milnor fibre

Mathematische Annalen -     

Variations of mixed Hodge structure, Higgs fields, and quantum cohomology

Following C. Simpson, we show that every variation of graded-polarized mixed Hodge structure defined over ℚ carries a natural Higgs bundle structure which is invariant under the ℂ^* action studied in [20]. We then specialize our construction to the context of [6], and show that the resulting Higgs field θ determines (and is determined by) the Gromov–Witten potential of the underlying family of Calabi–Yau threefolds. Received: 14 February 2000     

Asymptotic integrals and Hodge structures

The survey is devoted to the asymptotics of integrals of the method of descent and to the Hodge structures of critical points of phases of integrals. The problem of how asymptotics change under deformation of phases is discussed.Translated from Itogi Nauki i Tekhniki, Seriya Sovremennye Problemy Matematiki, Vol. 22, pp. 130–166, 1983.     

Weight filtration of the limit mixed Hodge structure at infinity for tame polynomials

We give three new proofs of a theorem of C. Sabbah asserting that the weight filtration of the limit mixed Hodge structure at infinity of cohomologically tame polynomials coincides with the monodromy filtration up to a certain shift depending on the unipotent or non-unipotent monodromy part.     

Moduli of polarized Hodge structures

Around 1970 Griffiths introduced the moduli of polarized Hodge structures/ the period domain D and described a dream to enlarge D to a moduli space of degenerating polarized Hodge structures. Since in general D is not a Hermitian symmetric domain, he asked for the existence of a certain automorphic cohomology theory for D, generalizing the usual notion of automorphic forms on symmetric Hermitian domains. Since then there have been many efforts in the first part of Griffith's dream but the second part still lives in darkness. The objective of the present text is two-folded. First, we give an exposition of the subject. Second, we give another formulation of the Griffiths problem, based on the classical Weierstrass uniformization theorem.     

On monodromy of complex projective structures

Summary We prove that for any nonelementary representation : ₁(S SL (2, )) of the fundamental group of a closed orientable hyperbolic surfaceS there exists a complex projective structure onS with the monodromy .Oblatum IV-1993 & 24-IV-1994