Jacobian Conjecture
Mostrando 1-7 de 7 artigos, teses e dissertações.
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1. New classes of polynomial maps satisfying the real Jacobian conjecture in ℝ2
Abstract: We present two new classes of polynomial maps satisfying the real Jacobian conjecture in ℝ 2. The first class is formed by the polynomials maps of the form (q(x)–p(y), q(y)+p(x)) : R 2 ⟶ R 2 such that p and q are real polynomials satisfying p'(x)q'(x) ≠ 0. The second class is formed by polynomials maps (f, g): R 2 ⟶ R 2 wh
An. Acad. Bras. Ciênc.. Publicado em: 01/07/2019
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2. A new qualitative proof of a result on the real jacobian conjecture
Seja F = (f, g) : R2 → R2 uma aplicação polinomial tal que det DF(x) é diferente de zero para todos x ∈ R2. Assumimos que os graus de f e g são iguais. Denotamos por e as partes homogêneas de maior grau de f e g, respectivamente. Nesta nota, damos uma demonstração baseada na teoria qualitativa de equações diferenciais do seguinte resultado: Se
An. Acad. Bras. Ciênc.. Publicado em: 25/08/2015
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3. Uma condição de injetividade e a estabilidade assintótica global no plano / A injectividade condition and the global asymptotic estability on the plane
Neste trabalho, estamos interessados em estudar a solução do seguinte problema: Seja Y = ( f ,g) um campo de vetores, de classe C1, em R2. Suponha que (x, y) = (0,0) é um ponto singular de Y e suponha que, para todo q ∈ R2, os autovalores de DY tem parte real negativa, isto é, det(DY) >0 e tr(DY) <0. Então, a solução (x, y) = (0,0) de Y é globa
IBICT - Instituto Brasileiro de Informação em Ciência e Tecnologia. Publicado em: 29/03/2010
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4. Uma condição de injetividade e a estabilidade assintótica global no plano / A injectividade condition and the global asymptotic estability on the plane
In this work we are interested in the solution of the following problem: Let Y = ( f ,g) be a vector field of class C1 in R2. Suppose that (x, y) = (0,0) is a singular point of Y and assume that for any q ∈ R2, the eigenvalues of DY have negative real part, this is, det(DY) >0 and tr(DY) <0. Then, the solution (x, y) = (0,0) of Y is globally asymptotic
Publicado em: 2010
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5. Global injectivity for applications between euclidean spaces / Injetividade global para aplicações entre espaços euclideanos
We present some results which give suficient conditions for a local diffeomorphism from the n-dimensional Euclidean space into itself be globally injective. Within this context, we consider some partial results addressed to solve the well known Fixed Point Conjecture and Jacobian Conjecture. From the dynamical point of view, there are connections between glo
Publicado em: 2007
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6. Fixed points of periodic maps
Let f be a periodic differentiable map from a sphere to itself. A well-known conjecture of Smith asserts that in many cases (e.g., when the fixed points are isolated) the derivatives of f at its fixed points, regarded as Jacobian matrices, are linearly similar. Here we give counterexamples to this conjecture. The results show that, in many cases, these Jacob
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7. Adjoint modular Galois representations and their Selmer groups
In the last 15 years, many class number formulas and main conjectures have been proven. Here, we discuss such formulas on the Selmer groups of the three-dimensional adjoint representation ad(φ) of a two-dimensional modular Galois representation φ. We start with the p-adic Galois representation φ0 of a modular elliptic curve E and present a formula ex
The National Academy of Sciences of the USA.