𝔖 Bobbio Scriptorium
✦   LIBER   ✦

The existence of solutions for a nonlinear mixed problem of singular fractional differential equations

✍ Scribed by Baleanu, Dumitru; Mohammadi, Hakimeh; Rezapour, Shahram

Book ID
125401712
Publisher
Springer International Publishing AG
Year
2013
Tongue
English
Weight
230 KB
Volume
2013
Category
Article
ISSN
1687-1839

No coin nor oath required. For personal study only.

πŸ“œ SIMILAR VOLUMES

Positive solutions for mixed problems of
Positive solutions for mixed problems of singular fractional differential equations
✍ Ravi P. Agarwal; Donal O'Regan; Svatoslav StanΔ›k πŸ“‚ Article πŸ“… 2011 πŸ› John Wiley and Sons 🌐 English βš– 169 KB

## Abstract We investigate the existence of positive solutions to the singular fractional boundary value problem: \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$^c\hspace{-1.0pt}D^{\alpha }u +f(t,u,u^{\prime },^c\hspace{-2.0pt}D^{\mu }u)=0$\end{document}, __u__β€²(0) = 0

Existence of positive solutions of the b
Existence of positive solutions of the boundary value problem for nonlinear fractional differential equations
✍ C.F. Li; X.N. Luo; Yong Zhou πŸ“‚ Article πŸ“… 2010 πŸ› Elsevier Science 🌐 English βš– 673 KB

In this paper, we are concerned with the nonlinear differential equation of fractional order where D Ξ± 0+ is the standard Riemann-Liouville fractional order derivative, subject to the boundary conditions We obtain the existence and multiplicity results of positive solutions by using some fixed poi

Existence of positive solutions for the
Existence of positive solutions for the boundary value problem of nonlinear fractional differential equations
✍ Xiong Yang; Zhongli Wei; Wei Dong πŸ“‚ Article πŸ“… 2012 πŸ› Elsevier Science 🌐 English βš– 231 KB

In this paper, we investigate the nonlinear differential equation of fractional order. C D a 0þ uðtÞ ¼ f ðt; uðtÞ; u 0 ðtÞÞ; 1 < a 6 2; 0 < t < 1; where C D a 0þ is the Caputo fractional derivative, subject to the boundary conditions. By means of Schauder's fixed point theorem and an extension of