Joana Cirici scite author profile

Abstract. Let X be a smooth complex algebraic variety. Morgan [Mor78] showed that the rational homotopy type of X is a formal consequence of the differential graded algebra defined by the first term E 1 (X, W ) of its weight spectral sequence. In the present work we generalize this result to arbitrary nilpotent complex algebraic varieties (possibly singular and/or non-compact) and to algebraic morphisms between them. The result for algebraic morphisms generalizes the Formality Theorem of [DGMS75] for compact Kähler varieties, filling a gap in Morgan's theory concerning functoriality over the rational numbers. As an application, we study the Hopf invariant of certain algebraic morphisms using intersection theory.

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Topological and geometric aspects of almost Kähler manifolds via harmonic theory

Cirici

Wilson

2020

Sel. Math. New Ser.

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The well-known Kähler identities naturally extend to the nonintegrable setting. This paper deduces several geometric and topological consequences of these extended identities for compact almost Kähler manifolds. Among these are identities of various Laplacians, generalized Hodge and Serre dualities, a generalized hard Lefschetz duality, and a Lefschetz decomposition, all on the space of d-harmonic forms of pure bidegree. There is also a generalization of Hodge Index Theorem for compact almost Kähler 4-manifolds. In particular, these provide topological bounds on the dimension of the space of d-harmonic forms of pure bidegree, as well as several new obstructions to the existence of a symplectic form compatible with a given almost complex structure.

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Dolbeault cohomology for almost complex manifolds

Cirici

Wilson

2021

Advances in Mathematics

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Dolbeault cohomology for almost complex manifolds

Cirici¹,

Wilson²

2018

Preprint

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This paper extends Dolbeault cohomology and its surrounding theory to arbitrary almost complex manifolds. We define a spectral sequence converging to ordinary cohomology, whose first page is the Dolbeault cohomology, and develop a harmonic theory which injects into Dolbeault cohomology. Lie-theoretic analogues of the theory are developed which yield important calculational tools for Lie groups and nilmanifolds. Finally, we study applications to maximally non-integrable manifolds, including nearly Kähler 6-manifolds, and show Dolbeault cohomology can be used to prohibit the existence of nearly Kähler metrics.

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Mixed Hodge structures and formality of symmetric monoidal functors

Cirici¹,

Horel²

2017

Preprint

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We use mixed Hodge theory to show that the functor of singular chains with rational coefficients is formal as a lax symmetric monoidal functor, when restricted to complex schemes whose weight filtration in cohomology satisfies a certain purity property. This has direct applications to the formality of operads or, more generally, of algebraic structures encoded by a colored operad. We also prove a dual statement, with applications to formality in the context of rational homotopy theory. In the general case of complex schemes with non-pure weight filtration, we relate the singular chains functor to a functor defined via the first term of the weight spectral sequence.

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Joana Cirici

E₁–formality of complex algebraic varieties

Topological and geometric aspects of almost Kähler manifolds via harmonic theory

Dolbeault cohomology for almost complex manifolds

Dolbeault cohomology for almost complex manifolds

Mixed Hodge structures and formality of symmetric monoidal functors

Contact Info

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Resources

About

Joana Cirici

E1–formality of complex algebraic varieties

Topological and geometric aspects of almost Kähler manifolds via harmonic theory

Dolbeault cohomology for almost complex manifolds

Dolbeault cohomology for almost complex manifolds

Mixed Hodge structures and formality of symmetric monoidal functors

Contact Info

Product

Resources

About

E₁–formality of complex algebraic varieties