Higher-Order Symmetries of a Time-Fractional Anomalous Diffusion Equation

Higher-order symmetries are constructed for a linear anomalous diffusion equation with the Riemann-Liouville time-fractional derivative of order alpha is an element of(0,1)boolean OR(1,2). It is proved that the equation in question has infinite sequences of nontrivial higher-order symmetries that are generated by two local recursion operators. It is also shown that some of the obtained higher-order symmetries can be rewritten as fractional-order symmetries, and corresponding fractional-order recursion operators are presented. The proposed approach for finding higher-order symmetries is applicable for a wide class of linear fractional differential equations.