We consider initial boundary value problem for uniformly 2-parabolic differential operator of second order in cylinder domain in ${\mathbb R}^n $ with non-coercive boundary conditions. In this case there is a loss of smoothness of the solution in Sobolev type spaces compared with the coercive situation. Using by Faedo-Galerkin method we prove that problem has unique solution in special Bochner space.
The initial boundary value problem for the Einstein equations with totally geodesic timelike boundary
On the initial boundary value problem for the vacuum Einstein equations and geometric uniqueness
Initial boundary value problem of a class of pseudo-parabolic Kirchhoff equations with logarithmic nonlinearity
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