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On a class of infinite system of third-order differential equations in lp via measure of noncompactness

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In this paper, with the help of measure of noncompactness together with Darbo-type fixed point theorem, we focus on the infinite system of third-order differential equations u′′′ i + au… Click to show full abstract

In this paper, with the help of measure of noncompactness together with Darbo-type fixed point theorem, we focus on the infinite system of third-order differential equations u′′′ i + au ′′ i + bu ′ i + cui = fi(t,u1(t),u2(t), . . .) where fi ∈ C(R × R∞,R) is ω-periodic with respect to the first coordinate and a, b, c ∈ R are constants. The aim of this paper is to obtain the results with respect to the existence of ω-periodic solutions of the aforementioned system in the Banach sequence space `p (1 ≤ p < ∞) utilizing the respective Green’s function. Furthermore, some examples are provided to support our main results.

Keywords: infinite system; system; order differential; measure noncompactness; system third; third order

Journal Title: Filomat
Year Published: 2020

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