Non-classical heat conduction problem with non local source

Abstract

We consider the non-classical heat conduction equation, in the domain D=n-1×+, for which the internal energy supply depends on an integral function in the time variable of % (y , t) ∫0t ux(0 , y , s) ds, %where ux(0 , y , s) is the heat flux on the boundary S=∂ D, with homogeneous Dirichlet boundary condition and an initial condition. The problem is motivated by the modeling of temperature regulation in the medium. The solution to the problem is found using a Volterra integral equation of second kind in the time variable t with a parameter in n-1. The solution to this Volterra equation is the heat flux (y, s) V(y , t)= ux(0 , y , t) on S, which is an additional unknown of the considered problem. We show that a unique local solution exists, which can be extended globally in time. Finally a one-dimensional case is studied with some simplifications, we obtain the solution explicitly by using the Adomian method and we derive its properties.