Electronic Journal of Differential Equations

Electron. J. Diff. Eqns., Vol. 2004(2004), No. 63, pp. 1-6.

Existence of $\psi$ -bounded solutions for a system of differential equations
Aurel Diamandescu

Abstract:
In this article, we present a necessary and sufficient condition for the existence of solutions to the linear nonhomogeneous system $x'=A(t)x + f(t)$

. Under the condition stated, for every Lebesgue $\Psi$ -integrable function $f$

there is at least one $\Psi$ -bounded solution on the interval $(0,+\infty)$ .

Submitted March 5, 2004. Published April 23, 2004.
Math Subject Classifications: 34D05, 34C11.
Key Words: $\Psi$ -bounded, Lebesgue $\Psi$ -integrable function.

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Aurel Diamandescu
Department of Applied Mathematics
University of Craiova, 13 "Al. I. Cuza" st.
200.585 Craiova, Romania
email: adiamandescu@central.ucv.ro

	Aurel Diamandescu Department of Applied Mathematics University of Craiova, 13 "Al. I. Cuza" st. 200.585 Craiova, Romania email: adiamandescu@central.ucv.ro

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Existence of -bounded solutions for a system of differential equations Aurel Diamandescu

Existence of $\psi$ -bounded solutions for a system of differential equations
Aurel Diamandescu