A posteriori error analysis for variable-coefficient multiterm time-fractional subdiffusion equations

Abstract

An initial-boundary value problem of subdiffusion type is considered; the temporal component of the differential operator has the form Σi=1qi(t)\, D t αi u(x,t), where the qi are continuous functions, each D t αi is a Caputo derivative, and the αi lie in (0,1]. Maximum/comparison principles for this problem are proved under weak hypotheses. A new positivity result for the multinomial Mittag-Leffler function is derived. A posteriori error bounds are obtained in L2() and L∞(), where the spatial domain lies in d with d∈\1,2,3\. An adaptive algorithm based on this theory is tested extensively and shown to yield accurate numerical solutions on the meshes generated by the algorithm.