A counterexample in the theory of linear singularly perturbed systems

Raúl Naulin

Veröffentlicht

1991-01-01

A counterexample in the theory of linear singularly perturbed systems

Schlagworte:

Bounded solutions, system linear algebraic system, bounded functions, Lipschitz function (en)
Soluciones acotadas, sistema lineal, sistema algebráico, funciones acotadas, función de Lipschitz (es)

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Autor/innen

Raúl Naulin Universidad de Oriente

Abstract (en)
Abstract (es)

In this note we compare the bounded solutions of the linear singularly perturbed system ε X' = A (t) x + f (t), with the solutions of the algebraic system A (t) x + f (t) = 0. Here A and f are bounded C¹ functions with bounded derivatives. We assume that the eigenvalues of A (t) satisfy | R e λ (t )| ≥ y > 0. It is known that for small ε, the following estimate is valid hasta ||kε (f) + A-1 f || ≤ εL || f ||₁, where kε(f) denotes the bounded solution of ε X' = A(t)x +f (t), || f || = sup R| f(t)|, || f ||₁: = || f || +|| f´ || and L is a constant.

We prove that this estimate cannot be replaced by ||k_ε (f) + A^-1 f || ≤ εL || f ||. Futhermore, if, instead of the condition that A be C¹, we require that the function be bounded and Lipschitz continuous, we show that the same estimate, ||k_ε (f) + A^-1 || ≤ εL || f ||₁, can be obtained.

En esta nota se comparan las soluciones acotadas del sistema lineal singularmente perturbado ε X' = A (t) x + f (t), con las soluciones del sistema algebráico A (t) x + f (t) = 0. Aquí A y f son funciones acotadas de clase C¹, con derivadas acotadas. Suponemos además que los valores propios de A (t) satisfacen la condición | R e λ (t)| ≥ y > 0. Es sabido que para ϵ C¹ y ε suficientemente pequeños vale la siguiente estimación: ||k_ε (f) + A^-1 || ≤ εL || f ||₁, donde k_ε(f) denota la única solución acotada de ε X' = A(t)x +f (t), || f || = sup R| f(t)|, || f ||₁: = || f || +|| f´ || y L es una constante que no depende de f ni de ε. Probaremos que esta estimación no puede ser extendida hasta ||k_ε (f) + A^-1 f || ≤ εL || f ||. Además, si en lugar de exigir que A sea de clase C¹pedimos que A sea una función de Lipschitz acotada, entonces sigue siendo válida la estimación ||k_ε (f) + A^-1 || ≤ εL || f ||₁.

Zitationsvorschlag

APA

Naulin, R. (1991). A counterexample in the theory of linear singularly perturbed systems. Revista Colombiana de Matemáticas, 25(1-4), 95–102. https://revistas.unal.edu.co/index.php/recolma/article/view/33395

ACM

[1]

Naulin, R. 1991. A counterexample in the theory of linear singularly perturbed systems. Revista Colombiana de Matemáticas. 25, 1-4 (Jan. 1991), 95–102.

ACS

(1)

Naulin, R. A counterexample in the theory of linear singularly perturbed systems. rev.colomb.mat 1991, 25, 95-102.

ABNT

NAULIN, R. A counterexample in the theory of linear singularly perturbed systems. Revista Colombiana de Matemáticas, [S. l.], v. 25, n. 1-4, p. 95–102, 1991. Disponível em: https://revistas.unal.edu.co/index.php/recolma/article/view/33395. Acesso em: 22 jan. 2025.

Chicago

Naulin, Raúl. 1991. „A counterexample in the theory of linear singularly perturbed systems“. Revista Colombiana De Matemáticas 25 (1-4):95-102. https://revistas.unal.edu.co/index.php/recolma/article/view/33395.

Harvard

Naulin, R. (1991) „A counterexample in the theory of linear singularly perturbed systems“, Revista Colombiana de Matemáticas, 25(1-4), S. 95–102. Verfügbar unter: https://revistas.unal.edu.co/index.php/recolma/article/view/33395 (Zugegriffen: 22 Januar 2025).

IEEE

[1]

R. Naulin, „A counterexample in the theory of linear singularly perturbed systems“, rev.colomb.mat, Bd. 25, Nr. 1-4, S. 95–102, Jan. 1991.

MLA

Naulin, R. „A counterexample in the theory of linear singularly perturbed systems“. Revista Colombiana de Matemáticas, Bd. 25, Nr. 1-4, Januar 1991, S. 95-102, https://revistas.unal.edu.co/index.php/recolma/article/view/33395.

Turabian

Naulin, Raúl. „A counterexample in the theory of linear singularly perturbed systems“. Revista Colombiana de Matemáticas 25, no. 1-4 (Januar 1, 1991): 95–102. Zugegriffen Januar 22, 2025. https://revistas.unal.edu.co/index.php/recolma/article/view/33395.

Vancouver

1.

Naulin R. A counterexample in the theory of linear singularly perturbed systems. rev.colomb.mat [Internet]. 1. Januar 1991 [zitiert 22. Januar 2025];25(1-4):95-102. Verfügbar unter: https://revistas.unal.edu.co/index.php/recolma/article/view/33395