Existencia y dependencia continua de solución de la ecuación Boussinesq de onda en espacios de Sobolev periódico

Existencia y dependencia continua de solución de la ecuación Boussinesq de onda en espacios de Sobolev periódico

We will begin our study, focusing on the theory of periodic Sobolev spaces, for this we cite [1]. Then, we will prove that the non-homogeneous Boussinesq equation has a local solution and that the solution also continually depends on the initial data and non-homogeneity, we do this intuitively using...

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Bibliographic Details
Main Authors: Victor Papuico Bernardo, Yolanda Santiago Ayala
Format: Article
Language:Spanish
Published: Universidad Nacional de Trujillo 2020-07-01
Series:Selecciones Matemáticas
Subjects:
family of strongly continuous operators
boussinesq equation
fourier theory
periodic sobolev spaces
Online Access:https://revistas.unitru.edu.pe/index.php/SSMM/article/view/2958/3287
Description
Summary:We will begin our study, focusing on the theory of periodic Sobolev spaces, for this we cite [1]. Then, we will prove that the non-homogeneous Boussinesq equation has a local solution and that the solution also continually depends on the initial data and non-homogeneity, we do this intuitively using Fourier theory and in an elegant version introducing families of strongly continuous operators, inspired by the work of Iorio [1], Santiago and Rojas [4], [3] and [2].
ISSN:2411-1783

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