On the Norm with Respect to Vector Measures of the Solution of an Infinite System of Ordinary Differential Equations

• Published in: Mediterranean journal of mathematics Vol. 12; no. 3; pp. 939 - 956
• Main Author: Galdames Bravo, Orlando
• Format: Journal Article
• Language: English
• Published: Basel Springer Basel 01.07.2015
• Subjects: Mathematics; Mathematics and Statistics; Primary 46G10; vector measure; system of differential equations; integral equation; Banach function space; 46N20; Secondary 47N20
• ISSN: 1660-5446; 1660-5454
• DOI: 10.1007/s00009-014-0445-7

In the present paper we give some necessary conditions that satisfy the solutions of an infinite system of ordinary differential equations. We investigate the behavior of the solutions of a general system of equations, regarding the norm of a Banach function space based on a vector measure. To this aim we construct a vector measure by an standard procedure. Assuming that the solution of each individual equation of the system belongs to a Banach function space based on scalar measures we deduce, with natural conditions, that a solution of such system belongs to a Banach function space based on a vector measure. We also give an example of a system of non-linear Bernoulli equations and show the relation with an equation involving the integral operator.