Abstract
The existence criterion has been extensively studied for different classes in fractional differential equations (FDEs) through different mathematical methods. The class of fractional order boundary value problems (FOBVPs) with p-Laplacian operator is one of the most popular class of the FDEs which have been recently considered by many scientists as regards the existence and uniqueness. In this scientific work our focus is on the existence and uniqueness of the FOBVP with p-Laplacian operator of the form: $D^{\gamma}(\phi_{p}(D^{\theta}z(t)))+a(t)f(z(t)) =0$ , $3<{\theta}$ , $\gamma\leq{4}$ , $t\in[0,1]$ , $z(0)=z'''(0)$ , $\eta D^{\alpha}z(t)|_{t=1}= z'(0)$ , $\xi z''(1)-z''(0)=0$ , $0<\alpha<1$ , $\phi_{p}(D^{\theta}z(t))|_{t=0}=0 =(\phi_{p}(D^{\theta}z(t)))'|_{t=0}$ , $(\phi_{p}(D^{\theta} z(t)))''|_{t=1} = \frac{1}{2}(\phi_{p}(D^{\theta} z(t)))''|_{t=0}$ , $(\phi_{p}(D^{\theta}z(t)))'''|_{t=0}=0$ , where $0<\xi, \eta<{1}$ and $D^{\theta}$ , $D^{\gamma}$ , $D^{\alpha}$ are Caputo’s fractional derivatives of orders θ, γ, α, respectively. For this purpose, we apply Schauder’s fixed point theorem and the results are checked by illustrative examples.
Highlights
Fractional calculus has widely been studied by scientists from the era of Leibniz to the present and has drawn the attention of mathematicians, engineers, and physicists in many scientific disciplines based on mathematical modeling, and it was found that the fractional order models are more precise in comparison with integer order models and, we can see many useful fractional order models in fluid flow, viscoelasticity, signal processing, and many other fields
The class of fractional order boundary value problems (FOBVPs) with p-Laplacian operator is one of the most popular class of the fractional differential equations (FDEs) which have been recently considered by many scientists as regards the existence and uniqueness
In this scientific work our focus is on the existence and uniqueness of the FOBVP with p-Laplacian operator of the form: Dγ (φp(Dθ z(t))) + a(t)f (z(t)) = 0, 3 < θ, γ ≤ 4, t ∈ [0, 1], z(0) = z (0), ηDαz(t)|t=1 = z (0), ξ z (1) – z (0) = 0, 0 < α < 1, φp(Dθ z(t))|t=0 = 0 = (φp(Dθ z(t))) |t=0, (φp(Dθ z(t))) |t=1 =
Summary
Fractional calculus has widely been studied by scientists from the era of Leibniz to the present and has drawn the attention of mathematicians, engineers, and physicists in many scientific disciplines based on mathematical modeling, and it was found that the fractional order models are more precise in comparison with integer order models and, we can see many useful fractional order models in fluid flow, viscoelasticity, signal processing, and many other fields. The class of fractional order boundary value problems (FOBVPs) with p-Laplacian operator is one of the most popular class of the FDEs which have been recently considered by many scientists as regards the existence and uniqueness. In this scientific work our focus is on the existence and uniqueness of the FOBVP with p-Laplacian operator of the form: Dγ (φp(Dθ z(t))) + a(t)f (z(t)) = 0, 3 < θ , γ ≤ 4, t ∈ [0, 1], z(0) = z (0), ηDαz(t)|t=1 = z (0), ξ z (1) – z (0) = 0, 0 < α < 1, φp(Dθ z(t))|t=0 = 0 = (φp(Dθ z(t))) |t=0, (φp(Dθ z(t))) |t=1 =
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