This work is devoted to the study the linear Moore-Gibson-Thompson equation with a viscoelastic memory. Under some appropriate assumptions on the relaxation function g and with certain initial data, the existence and uniqueness of a local solution are obtained via Faedo--Galerkin's method. The global existence of solutions is also established. Furthermore, we prove the decay rates for the energy of Moore-Gibson-Thompson equation linear with a viscoelastic memory of relaxation kernels.
Ala Eddine Draifia (Mon,) studied this question.