A note on M. Soares’ bounds

Eduardo Esteves; Israel Vainsencher

Displaying similar documents to “A note on M. Soares’ bounds”

Finite determinacy of dicritical singularities in $(ℂ^{2}, 0)$

Gabriel Calsamiglia-Mendlewicz (2007)

Annales de l’institut Fourier

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For germs of singularities of holomorphic foliations in $(ℂ^{2}, 0)$ which are regular after one blowing-up we show that there exists a functional analytic invariant (the transverse structure to the exceptional divisor) and a finite number of numerical parameters that allow us to decide whether two such singularities are analytically equivalent. As a result we prove a formal-analytic rigidity theorem for this kind of singularities.

A Fatou-Julia decomposition of transversally holomorphic foliations

Taro Asuke (2010)

Annales de l’institut Fourier

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A Fatou-Julia decomposition of transversally holomorphic foliations of complex codimension one was given by Ghys, Gomez-Mont and Saludes. In this paper, we propose another decomposition in terms of normal families. Two decompositions have common properties as well as certain differences. It will be shown that the Fatou sets in our sense always contain the Fatou sets in the sense of Ghys, Gomez-Mont and Saludes and the inclusion is strict in some examples. This property is important when...

The $C^{1}$ invariance of the algebraic multiplicity of a holomorphic vector field

Rudy Rosas (2010)

Annales de l’institut Fourier

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We prove that the algebraic multiplicity of a holomorphic vector field at an isolated singularity is invariant by $C^{1}$ equivalences.

Normalization of bundle holomorphic contractions and applications to dynamics

François Berteloot, Christophe Dupont, Laura Molino (2008)

Annales de l’institut Fourier

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We establish a Poincaré-Dulac theorem for sequences ${(G_{n})}_{n \in ℤ}$ of holomorphic contractions whose differentials $d_{0} G_{n}$ split regularly. The resonant relations determining the normal forms hold on the moduli of the exponential rates of contraction. Our results are actually stated in the framework of bundle maps. Such sequences of holomorphic contractions appear naturally as iterated inverse branches of endomorphisms of $ℂ ℙ^{k}$ . In this context, our normalization result allows to estimate precisely...

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...

Displaying similar documents to “A note on M. Soares’ bounds”

Finite determinacy of dicritical singularities in ( ℂ 2 , 0 )

A Fatou-Julia decomposition of transversally holomorphic foliations

The C 1 invariance of the algebraic multiplicity of a holomorphic vector field

Normalization of bundle holomorphic contractions and applications to dynamics

On Halphen’s Theorem and some generalizations

Finite determinacy of dicritical singularities in $(ℂ^{2}, 0)$

The $C^{1}$ invariance of the algebraic multiplicity of a holomorphic vector field