Numerical solutions of the space-time fractional advection-dispersion equation

## Abstract An analytical transport‐model was developed to simulate the propagation of a contaminant in one‐ and two‐dimensional transient flow in groundwater. It is proved that the distribution of concentration at a given time and for a given discharge is identical to that obtained for a different

We study the fractional differential equation ( \* ) D α u(t) where X is a Banach space. Using functional calculus and operator valued Fourier multiplier theorems, we characterize, in U M D spaces, the well posedness of ( \* ) in terms of R-boundedness of the sets {(ik) α ((ik Applications to the

## Abstract Let __D__ ⊂ ℝ^__n__^ be a bounded domain with piecewise‐smooth boundary, and __q__(__x__,__t__) a smooth function on __D__ × [0, __T__]. Consider the time‐like Cauchy problem magnified image magnified image Given __g__, __h__ for which the equation has a solution, we show how to approxi