2016
DOI: 10.1002/mma.3951
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Matrix measure on time scales and almost periodic analysis of the impulsive Lasota–Wazewska model with patch structure and forced perturbations

Abstract: In this paper, a new impulsive Lasota–Wazewska model with patch structure and forced perturbed terms is proposed and analyzed on almost periodic time scales. For this, we introduce the concept of matrix measure on time scales and obtain some of its properties. Then, sufficient conditions are established which ensure the existence and exponential stability of positive almost periodic solutions of the proposed biological model. Our results are new even when the time scale is almost periodic, in particular, for p… Show more

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Cited by 19 publications
(11 citation statements)
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“…Because g ∈ H δ ( f ), there is a sequence α ∈Π such that T δ α f (t, x) = g(t, x) holds uniformly on T * × S. According to Corollary 3.4 from [30], there exists α ⊂ α such that T δ α ϕ(t) = ψ(t) holds uniformly on T * . Therfore, ψ(t) is a solution to (13). Moreover, it follows from |ϕ(t)| ≤ λ that |ψ(t)| ≤ λ.…”
Section: Almost Periodic Dynamic Equations Under Matched Spacesmentioning
confidence: 99%
See 4 more Smart Citations
“…Because g ∈ H δ ( f ), there is a sequence α ∈Π such that T δ α f (t, x) = g(t, x) holds uniformly on T * × S. According to Corollary 3.4 from [30], there exists α ⊂ α such that T δ α ϕ(t) = ψ(t) holds uniformly on T * . Therfore, ψ(t) is a solution to (13). Moreover, it follows from |ϕ(t)| ≤ λ that |ψ(t)| ≤ λ.…”
Section: Almost Periodic Dynamic Equations Under Matched Spacesmentioning
confidence: 99%
“…Lemma 4. Assume that ϕ(t) is a minimum norm solution for (12) and there is a sequence α ⊆Π such that T δ α f (t, x) = g(t, x) exists uniformly on T * × S. Furthermore, if there is a subsequence α ⊂ α such that T δ α ϕ(t) = ψ(t) holds uniformly on T * , then ψ(t) is a minimum norm solution for (13).…”
Section: Almost Periodic Dynamic Equations Under Matched Spacesmentioning
confidence: 99%
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