Data di Pubblicazione:
2015
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.
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.
Tipologia CRIS:
1.1 Articolo in rivista
Keywords:
Singular porous medium equations; Very weak solutions; Existence; Riesz potential
Elenco autori:
Boegelein, V.; Duzaar, F.; Gianazza, UGO PIETRO
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