Oscillation of Functional Differential Equations of n-th Order with Distributed Deviating Arguments

dc.contributor.author	Padhi, Seshadev
dc.contributor.author	Dix, Julio G.
dc.date.accessioned	2006-05-25T19:03:53Z
dc.date.available	2012-02-24T10:17:55Z
dc.date.issued	2006-05
dc.description.abstract	We establish conditions for the oscillation and asymptotic behavior of non-oscillatory solutions of the following functional differential equation with distributed deviating arguments. y(n)(t) + p(t)y(n-1)(t) + ∫bα q(t, ξ) ƒ(y(t), y(t - τ(t, ξ))) dσ(ξ) d = 0, We find explicit sufficient conditions for the oscillation as lower bounds for moments of the integral kernel q.
dc.description.department	Mathematics
dc.format	Text
dc.format.extent	10 pages
dc.format.medium	1 file (.pdf)
dc.identifier.citation	Padhi, S., & Dix, J. G. (2006). Oscillation of functional differential equations of N-TH order with distributed deviating arguments. Journal of Contemporary Mathematics, 1, pp. 11-24.
dc.identifier.uri	https://hdl.handle.net/10877/3820
dc.language.iso	en
dc.source	Journal of Contemporary Mathematics, 2006, Vol. 1, pp. 11-24.
dc.subject	differential equations
dc.subject	delay equations
dc.subject	oscillation
dc.subject	Mathematics
dc.title	Oscillation of Functional Differential Equations of n-th Order with Distributed Deviating Arguments
dc.type	Article

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