Nitsche's method applied to the stationary Boussinesq equations with mixed nonlinear boundary conditions yields a well-posed, optimally convergent finite element scheme with reliable a posteriori estimators under a smallness assumption on the data.
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Nitsche's method for the stationary Boussinesq system under mixed and nonlinear boundary conditions
Nitsche's method applied to the stationary Boussinesq equations with mixed nonlinear boundary conditions yields a well-posed, optimally convergent finite element scheme with reliable a posteriori estimators under a smallness assumption on the data.