Kealey Dias scite author profile

In order to understand the parameter space Ξ d of monic and centered complex polynomial vector fields in C of degree d, decomposed by the combinatorial classes of the vector fields, it is interesting to know the number of loci in parameter space consisting of vector fields with the same combinatorial data (corresponding to topological classification with fixed separatrices at infinity).This paper answers questions posed by Adam L. Epstein and Tan Lei about the total number of combinatorial classes and the number of combinatorial classes corresponding to loci of a specific (real) dimension q in parameter space, for fixed degree d; these numbers are denoted by c d and c d,q respectively. These results are extensions of a result by Douady, Estrada, and Sentenac, which shows that the number of combinatorial classes of the structurally stable complex polynomial vector fields in C of degree d is the Catalan number C d−1 .We show that enumerating the combinatorial classes is equivalent to a so-called bracketing problem. Then we analyze the generating functions and find closed-form expressions for c d and c d,q , and we furthermore make an asymptotic analysis of these sequences for d tending to ∞.These results are also applicable to special classes of Abelian differentials, quadratic differentials with double poles, and singular holomorphic foliations of the plane. Prepared using etds.cls [Version: 1999/07/21 v1.0] 2000 Mathematics Subject Classification: 37F75, 05A15, 05A16.

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Numerical Analysis on the Sierpinski Gasket, With Applications to Schrödinger Equations, Wave Equation, and Gibbs' Phenomenon

Coletta

Dias

Strichartz

2004

Fractals

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On the separatrix graph of a rational vector field on the Riemann sphere

Dias

Garijo

2021

Journal of Differential Equations

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Kealey Dias

Classification of complex polynomial vector fields in one complex variable

Enumerating combinatorial classes of the complex polynomial vector fields in ℂ

Numerical Analysis on the Sierpinski Gasket, With Applications to Schrödinger Equations, Wave Equation, and Gibbs' Phenomenon

On the separatrix graph of a rational vector field on the Riemann sphere

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