The modeling of inverse problems of heat conduction with movable phase transition boundaries

A finite difference scheme is used to solve the nonlinear problem of heat transfer in a two-phase region with a movable phase transition boundary. Stefan and Verigin conditions are prescribed on the movable boundary; the temperature field within the region and the heat flux on the left boundary of the region are determined. An implicit difference scheme is constructed for the problem under consideration, and a method for modeling the scheme on an analog R-grid is proposed.