Infinitely many solutions for boundary value problems arising from the fractional advection dispersion equation

Chen, Jing; Tang, Xian Hua

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Infinitely many solutions for boundary value problems arising from the fractional advection dispersion equation. (English). Applications of Mathematics, vol. 60 (2015), issue 6, pp. 703-724

MSC: 26A33, 35G60 | MR 3436569 | Zbl 06537669 | DOI: 10.1007/s10492-015-0118-2

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Keywords:
fractional boundary value problem; critical point theory; variational methods

Summary:
We consider the existence of infinitely many solutions to the boundary value problem \begin {gather} \frac {{\rm d}}{{\rm d} t}\Big (\frac {1}{2} _{0}D_{t}^{-\beta }(u'(t)) +\frac {1}{2} _{t}D_{T}^{-\beta }(u'(t))\Big )+\nabla F(t,u(t))=0 \quad \text {\rm a.e.}\ t\in [0,T],\nonumber \\ u(0)=u(T)=0.\nonumber \end {gather} Under more general assumptions on the nonlinearity, we obtain new criteria to guarantee that this boundary value problem has infinitely many solutions in the superquadratic, subquadratic and asymptotically quadratic cases by using the critical point theory.

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