Diffusive Limit with Geometric Correction of Unsteady Neutron Transport Equation
Abstract
We consider the diffusive limit of an unsteady neutron transport equation in a two-dimensional plate with one-speed velocity. We show the solution can be approximated by the sum of interior solution, initial layer, and boundary layer with geometric correction. Also, we construct a counterexample to the classical theory in Bensoussan.Lions.Papanicolaou1979 which states the behavior of solution near boundary can be described by the Knudsen layer derived from the Milne problem.
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