Global solution on Cauchy problem in nonlinear non-simple thermoelastic materials

We prove a theorem about global existence (in time) of the solution to the initial-value problem for a nonliear system of coupled partial differential equations of fourth order describing the thermoelasticity of non-simple materias. We consider such the case of thim system in which some nonlinear coeffcients can depend not only on the temperature and the gradient of displacement and also on the second derivative of displacement. The corresponding global existence theorem has been proved using the L ^p – L ^q time decay estmates for the solution of the associated linearized problem. Next, we proved the energy estimate in the Sobolev space with constant independent of time. Such an energy estimate allows us to apply the standard continuation argument and to continue the local solution to one desired for all t ∈ (0, ∞)