Uniqueness in Rough  Almost Complex Structures, and Differential Inequalities

Jean-Pierre Rosay

Displaying similar documents to “Uniqueness in Rough Almost Complex Structures, and Differential Inequalities”

Schwarz Reflection Principle, Boundary Regularity and Compactness for $J$ -Complex Curves

Sergey Ivashkovich, Alexandre Sukhov (2010)

Annales de l’institut Fourier

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We establish the Schwarz Reflection Principle for $J$ -complex discs attached to a real analytic $J$ -totally real submanifold of an almost complex manifold with real analytic $J$ . We also prove the precise boundary regularity and derive the precise convergence in Gromov compactness theorem in $𝒞^{k, α}$ -classes.

On Halphen’s Theorem and some generalizations

Alcides Lins Neto (2006)

Annales de l’institut Fourier

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Let $M^{n}$ be a germ at $0 \in ℂ^{m}$ of an irreducible analytic set of dimension $n$ , where $n \geq 2$ and $0$ is a singular point of $M$ . We study the question: when does there exist a germ of holomorphic map $φ : (ℂ^{n}, 0) \to (M, 0)$ such that $φ^{- 1} (0) = {0}$ ? We prove essentialy three results. In Theorem 1 we consider the case where $M$ is a quasi-homogeneous complete intersection of $k$ polynomials $F = (F_{1}, ..., F_{k})$ , that is there exists a linear holomorphic vector field $X$ on $ℂ^{m}$ , with eigenvalues $λ_{1}, ..., λ_{m} \in ℚ_{+}$ such that $X (F^{T}) = U \cdot F^{T}$ , where $U$ is a $k \times k$ matrix with entries in $𝒪_{m}$ . We prove that if...

On proper discs in complex manifolds

Barbara Drinovec Drnovšek (2007)

Annales de l’institut Fourier

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Let $X$ be a complex manifold of dimension at least $2$ which has an exhaustion function whose Levi form has at each point at least $2$ strictly positive eigenvalues. We construct proper holomorphic discs in $X$ through any given point and in any given direction.

Small divisors and large multipliers

Boele Braaksma, Laurent Stolovitch (2007)

Annales de l’institut Fourier

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We study germs of singular holomorphic vector fields at the origin of $ℂ^{n}$ of which the linear part is $1$ -resonant and which have a polynomial normal form. The formal normalizing diffeomorphism is usually divergent at the origin but there exists holomorphic diffeomorphisms in some “sectorial domains” which transform these vector fields into their normal form. In this article, we study the interplay between the small divisors phenomenon and the Gevrey character of the sectorial normalizing...

On the Fefferman-Phong inequality

Abdesslam Boulkhemair (2008)

Annales de l’institut Fourier

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We show that the number of derivatives of a non negative 2-order symbol needed to establish the classical Fefferman-Phong inequality is bounded by $\frac{n}{2} + 4 + ϵ$ improving thus the bound $2 n + 4 + ϵ$ obtained recently by N. Lerner and Y. Morimoto. In the case of symbols of type $S_{0, 0}^{0}$ , we show that this number is bounded by $n + 4 + ϵ$ ; more precisely, for a non negative symbol $a$ , the Fefferman-Phong inequality holds if $\partial_{x}^{α} \partial_{ξ}^{β} a (x, ξ)$ are bounded for, roughly, $4 \leq | α | + | β | \leq n + 4 + ϵ$ . To obtain such results and others, we first prove an abstract result which...

Displaying similar documents to “Uniqueness in Rough Almost Complex Structures, and Differential Inequalities”

Schwarz Reflection Principle, Boundary Regularity and Compactness for J -Complex Curves

On Halphen’s Theorem and some generalizations

On proper discs in complex manifolds

Small divisors and large multipliers

On the Fefferman-Phong inequality

Schwarz Reflection Principle, Boundary Regularity and Compactness for $J$ -Complex Curves