Title :
Regular fractional Sturm-Liouville problem with discrete spectrum: Solutions and applications
Author :
Klimek, Malgorzata ; Blasik, Marek
Author_Institution :
Inst. of Math., Czestochowa Univ. of Technol., Czestochowa, Poland
Abstract :
In the paper, we consider a regular fractional Sturm-Liouville problem with left and right Caputo derivatives of order in the range (1/2, 1). It depends on an arbitary positive continuous function and obeys the mixed boundary conditions defined on a finite interval. We prove that it has an infinite countable set of positive eigenvalues and its continuous eigenvectors form a basis in the space of square-integrable functions. Eigenfunctions are then applied to solve 1D and 2D anomalous diffusion equations with variable diffusivity.
Keywords :
differential equations; eigenvalues and eigenfunctions; 1D anomalous diffusion equations; 2D anomalous diffusion equations; Caputo derivatives; arbitary positive continuous function; continuous eigenvectors form; discrete spectrum; eigenfunctions; finite interval; fractional Sturm-Liouville problem; infinite countable set; mixed boundary conditions; positive eigenvalues; square-integrable functions; variable diffusivity; Boundary conditions; Differential equations; Eigenvalues and eigenfunctions; Equations; Integral equations; Kernel; Mathematical model;
Conference_Titel :
Fractional Differentiation and Its Applications (ICFDA), 2014 International Conference on
Conference_Location :
Catania
DOI :
10.1109/ICFDA.2014.6967383
