Department of Mathematics and CMA, NOVA School of Science and Technology
In this talk we consider a class of tempered fractional terminal value problems of the Caputo type. We study the uniqueness and existence of the solution, analyse the continuous dependence on the given data and using a shooting method, we present and discuss numerical schemes for the numerical approximation of such problems.
In order to illustrate the theoretical results and evidence the efficiency of the numerical methods some numerical examples are considered.
This is a joint work with Maria Luisa Morgado (UTAD and CEMAT, IST).