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An index theorem for the anti-self-dual deformation complex on anti-self-dual orbifolds with cyclic quotient singularities is proved. We present two applications of this theorem. The first is to compute the dimension of the deformation space of the Calderbank–Singer scalar-flat Kähler toric ALE spaces. A corollary of this is that, except for the Eguchi–Hanson metric, all of these spaces admit non-toric anti-self-dual deformations, thus yielding many new examples of anti-self-dual ALE spaces. For...

Canonical equivariant extensions using classical Hodge theory.

Allday, Christopher (2005)

International Journal of Mathematics and Mathematical Sciences

Combinatorial Hodge Theory and Signature Operator.

Nicolae Teleman (1980)

Inventiones mathematicae

Conformal harmonic forms, Branson–Gover operators and Dirichlet problem at infinity

Erwann Aubry, Colin Guillarmou (2011)

Journal of the European Mathematical Society

For odd-dimensional Poincaré–Einstein manifolds $(X^{n + 1}, g)$ , we study the set of harmonic $k$ -forms (for $k < n / 2$ ) which are $C^{m}$ (with $m \in ℕ$ ) on the conformal compactification $\bar{X}$ of $X$ . This set is infinite-dimensional for small $m$ but it becomes finite-dimensional if $m$ is large enough, and in one-to-one correspondence with the direct sum of the relative cohomology $H^{k} (\bar{X}, \partial \bar{X})$ and the kernel of the Branson–Gover [3] differential operators $(L_{k}, G_{k})$ on the conformal infinity $(\partial \bar{X}, [h_{0}])$ . We also relate the set of $C^{n - 2 k + 1} (Λ^{k} (\bar{X}))$ forms in the kernel of $d + δ_{g}$ to the conformal...

Courants positifs extrêmaux et conjecture de Hodge.

Jean-Pierre Demailly (1982)

Inventiones mathematicae

De Rham-Hodge Theory for Riemannian Foliations.

F.W. Kamber, P. Tondeur (1987)

Mathematische Annalen

Décomposition de Hodge basique pour un feuilletage riemannien

Aziz El Kacimi-Alaoui, Gilbert Hector (1986)

Annales de l'institut Fourier

Soit $ℱ$ un feuilletage de codimension $n$ sur une variété compacte $M$ . On montre que le complexe des formes basiques $Ω^{*} (M / ℱ)$ admet une décomposition de Hodge. Il en résulte que la cohomologie basique $H^{*} (M / ℱ)$ de $(M, ℱ)$ est de dimension finie et vérifie la dualité de Poincaré si et seulemnt si $H^{n} (M / ℱ) \neq 0$ .

Déviations de moyennes ergodiques, flots de Teichmüller et cocycle de Kontsevich-Zorich

Raphaël Krikorian (2003/2004)

Séminaire Bourbaki

Étant donnée une fonction régulière de moyenne nulle sur le tore de dimension $2$ , il est facile de voir que ses intégrales ergodiques au-dessus d’un flot de translation “générique”sont bornées. Il y a une dizaine d’années, A. Zorich a observé numériquement une croissance en puissance du temps de ces intégrales ergodiques au-dessus de flots d’hamiltoniens (non-exacts) “génériques”sur des surfaces de genre supérieur ou égal à $2$ , et Kontsevich et Zorich ont proposé une explication (conjecturelle) de...

Duality of Hodge numbers of compact complex nilmanifolds

Takumi Yamada (2015)

Complex Manifolds

A compact K¨ahlerian manifoldM of dimension n satisfies hp,q(M) = hq,p(M) for each p, q.However, a compact complex manifold does not satisfy the equations in general. In this paper, we consider duality of Hodge numbers of compact complex nilmanifolds.

Fibrations of compact Kähler manifolds in terms of cohomological properties of their fundamental groups

Ngaiming Mok (2000)

Annales de l'institut Fourier

We prove fibration theorems on compact Kähler manifolds with conditions on first cohomology groups of fundamental groups with respect to unitary representations into Hilbert spaces. If the fundamental group T of compact Kähler manifold X violates Property (T) of Kazhdan’s, then $H^{1} (G a m m a, Φ) \neq 0$ for some unitary representation $Φ$ . By our earlier work there exists a $d$ -closed holomorphic 1-form with coefficients twisted by some unitary representation $Φ^{'}$ , possibly non-isomorphic to $Φ$ . Taking norms we obtains a positive...

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$𝐇$ -valued differential forms on $𝐇$

1 Structure de contact et équations aux dérivées partielles d'après V. V. Lychagin

A Hodge type decomposition for spinor valued forms

A Reduction Theorem for Cohomology Groups of Very Strongly q-convex Kähler Manifolds.

An Elementary Proof for a Compact Imbedding Result in Generalized Electromagnetic Theory.

Anti-self-dual orbifolds with cyclic quotient singularities

Canonical equivariant extensions using classical Hodge theory.

Combinatorial Hodge Theory and Signature Operator.

Conformal harmonic forms, Branson–Gover operators and Dirichlet problem at infinity

Courants positifs extrêmaux et conjecture de Hodge.

De Rham-Hodge Theory for Riemannian Foliations.

Décomposition de Hodge basique pour un feuilletage riemannien

Déviations de moyennes ergodiques, flots de Teichmüller et cocycle de Kontsevich-Zorich

Duality of Hodge numbers of compact complex nilmanifolds

Fibrations of compact Kähler manifolds in terms of cohomological properties of their fundamental groups

Formes harmoniques et cohomologie relative des algèbres de Lie.

Geodesic cycles and the Weil representation I ; quotients of hyperbolic space and Siegel modular forms

Harmonic cohomology classes of symplectic manifolds.

Harmonic mappings of Kähler manifolds to locally symmetric spaces

Harmonie Forms Dual to Geodesic Cycles in Quotients of SU (p, 1).

Currently displaying 1 – 20 of 49