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Asymptotic Behavior of Solutions of Higher Order Fractional Differential Equations with a Caputo-Type Hadamard Derivative |
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PP: 1-10 |
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doi:10.18576/pfda/060101
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Author(s) |
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John R. Graef,
Said R. Grace,
Ercan Tunc ̧,
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Abstract |
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| The present paper investigates the behavior of nonoscillatory solutions of the higher order fractional differential equation C,HDary(t)=e(t)+f(t,x(t)), a>1,
where C,HDar is a Caputo-type Hadamard derivative. The authors address the two cases y(t) = x(k)(t) with k a positive integer, and y(t) = c(t)(x′(t))μ′ with μ ≥ 1 being the ratio of odd positive integers. Here, r = n+α −1, α ∈ (0,1), and n ∈ Z+. |
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