1982
DOI: 10.4153/cmb-1982-049-8
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On Delay Differential Inequalities of Higher Order

Abstract: Consider the nth order (n ≥ 1) delay differential inequalities and and the delay differential equation , where q(t) ≥ 0 is a continuous function and p, τ are positive constants. Under the condition pτe ≥ 1 we prove that when n is odd (1) has no eventually positive solutions, (2) has no eventually negative solutions, and (3) has only oscillatory solutions and when n is even (1) has no eventually negative bounded solutions, (2) has no eventually positive bounded solutions, and every bounded solution of (3) is … Show more

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Cited by 44 publications
(39 citation statements)
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“…This implies that l/n /I \ ' [10] and, since a = a n , the last inequality, in view of (18) It is easy to see that w(t) is a solution of Equation (1) which belongs to Class (19) Class II 2n and that …”
Section: Q N X[t -A + (A-o^)] Q N X[t -A + /I(fi-a)]mentioning
confidence: 93%
“…This implies that l/n /I \ ' [10] and, since a = a n , the last inequality, in view of (18) It is easy to see that w(t) is a solution of Equation (1) which belongs to Class (19) Class II 2n and that …”
Section: Q N X[t -A + (A-o^)] Q N X[t -A + /I(fi-a)]mentioning
confidence: 93%
“…From the results in [5], we see that all bounded solutions of (E * ) are oscillatory if the following condition holds:…”
Section: Resultsmentioning
confidence: 99%
“…We mention in particular the papers by Koplatadze and Chanturia [1], Ladas [2], and Ladas and Stavroulakis [3]. for a survey of results concerned with oscillations we refer to Zhang [5] and the references therein.…”
Section: Introductionmentioning
confidence: 99%