Monotone iterative method for fractional differential equations
In this article, by using the lower and upper solution method, we prove the existence of iterative solutions for a class of fractional initial value problem with non-monotone term $$\displaylines{ D_{0+}^\alpha u(t)=f(t, u(t)), \quad t \in (0, h), \cr t^{1-\alpha}u(t)\big|_{t=0} = u_0 \neq 0, }$$ wh...
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| Published in | Electronic journal of differential equations Vol. 2016; no. 6; pp. 1 - 8 |
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| Main Authors | , , , |
| Format | Journal Article |
| Language | English |
| Published |
Texas State University
06.01.2016
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| Subjects | |
| Online Access | Get full text |
| ISSN | 1072-6691 |
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| Summary: | In this article, by using the lower and upper solution method, we prove the existence of iterative solutions for a class of fractional initial value problem with non-monotone term $$\displaylines{ D_{0+}^\alpha u(t)=f(t, u(t)), \quad t \in (0, h), \cr t^{1-\alpha}u(t)\big|_{t=0} = u_0 \neq 0, }$$ where $0<h<+\infty$, $f\in C([0, h]\times \mathbb{R}, \mathbb{R})$, $D_{0+}^\alpha u (t) $ is the standard Riemann-Liouville fractional derivative, $0<\alpha< 1$. A new condition on the nonlinear term is given to guarantee the equivalence between the solution of the IVP and the fixed-point of the corresponding operator. Moreover, we show the existence of maximal and minimal solutions. |
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| ISSN: | 1072-6691 |