We consider non-homogeneous, singular (0 < m < 1) porous medium type equations with a non-negative Radon-measure having finite total mass \mu(E_T) on the right-hand side. We deal with a Cauchy-Dirichlet problem for these type of equations, with homogeneous boundary conditions on the parabolic boundary of the domain E_T, and we establish the existence of a solution in the sense of distributions. Finally, we show that the constructed solution satises linear pointwise estimates via linear Riesz potentials.
Very weak solutions of singular porous medium equations with measure data
GIANAZZA, UGO PIETRO
2015-01-01
Abstract
We consider non-homogeneous, singular (0 < m < 1) porous medium type equations with a non-negative Radon-measure having finite total mass \mu(E_T) on the right-hand side. We deal with a Cauchy-Dirichlet problem for these type of equations, with homogeneous boundary conditions on the parabolic boundary of the domain E_T, and we establish the existence of a solution in the sense of distributions. Finally, we show that the constructed solution satises linear pointwise estimates via linear Riesz potentials.File in questo prodotto:
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