Abstract
In this paper, we investigate a mathematical model for the electromagnetic ‘induction heating’ of a continuous medium at rest. We assume that the magnetic induction field is a nonlinear function of the magnetic field
and that the electric conductivity
is temperature dependent. The coupling between the equations describing electro-magnetic field and the heat equation is provided through the nonlinear function
on the one hand and through the Joule heating term on the other hand. We prove the existence of a weak solution to this strongly coupled nonlinear system of Maxwell-heat equations with the truncated quadratic Joule heating term.