Add to ORKGWe discuss the existence of weak solutions to a steady-state coupled system between a two-phase Stefan problem, with convection and non-Fourier heat diffusion, and an elliptic variational inequality traducing the non-Newtonian flow only in the liquid phase. In the Stefan problem for the p-Laplacian equation the main restriction comes from the requirement that the liquid zone is at least an open subset, a fact that leads us to search for a continuous temperature field. Through the heat convection coupling term, this depends on the q-integrability of the velocity gradient and the imbedding theorems of Sobolev. We show that the appropriate condition for the continuity to hold, combining these two powers, is pq> n. This remarkably simple condit...
The Stefan problem is coupled with a spatially inhomogeneous and anisotropic Gibbs–Thomson condition...
We consider a nonlinear one-dimensional Stefan problem for a semi-infinite material x > 0, with phas...
The thesis is essentially devoted to prove existence results for some nonlinear partial differential...
We consider a stationary two-phase Stefan problem with prescribed convection and we prove existence ...
We consider a class of Stefan-type problems having a convection term and a pseudomonotone nonlinear ...
AbstractWe consider a class of Stefan-type problems having a convection term and a pseudomonotone no...
The well posedness of the two-phase Stefan problem with convection is established in L 1. First we c...
We show that the solution to the Stefan problem with a convective boundary condition tends to the qu...
Recently, in Tarzia (Thermal Sci 21A:1–11, 2017) for the classical two-phase Lamé–Clapeyron–Stefan p...
International audienceThis paper provides a generalized and simplified proof of the uniqueness of a ...
Abstract Consider a non-Newtonian fluid equation with a nonlinear convection term and a source term....
A model for the evolution of phase boundaries reminiscent of the phase-field model is considered. T...
We study the one-dimensional stationary solutions of the integro-differential equation which, as pro...
We present large-data existence result for weak solutions to a steady compressible Navier-Stokes-Fou...
This paper is concerned with singular Stefan problems in which the heat flux is proportional to the ...
The Stefan problem is coupled with a spatially inhomogeneous and anisotropic Gibbs–Thomson condition...
We consider a nonlinear one-dimensional Stefan problem for a semi-infinite material x > 0, with phas...
The thesis is essentially devoted to prove existence results for some nonlinear partial differential...
We consider a stationary two-phase Stefan problem with prescribed convection and we prove existence ...
We consider a class of Stefan-type problems having a convection term and a pseudomonotone nonlinear ...
AbstractWe consider a class of Stefan-type problems having a convection term and a pseudomonotone no...
The well posedness of the two-phase Stefan problem with convection is established in L 1. First we c...
We show that the solution to the Stefan problem with a convective boundary condition tends to the qu...
Recently, in Tarzia (Thermal Sci 21A:1–11, 2017) for the classical two-phase Lamé–Clapeyron–Stefan p...
International audienceThis paper provides a generalized and simplified proof of the uniqueness of a ...
Abstract Consider a non-Newtonian fluid equation with a nonlinear convection term and a source term....
A model for the evolution of phase boundaries reminiscent of the phase-field model is considered. T...
We study the one-dimensional stationary solutions of the integro-differential equation which, as pro...
We present large-data existence result for weak solutions to a steady compressible Navier-Stokes-Fou...
This paper is concerned with singular Stefan problems in which the heat flux is proportional to the ...
The Stefan problem is coupled with a spatially inhomogeneous and anisotropic Gibbs–Thomson condition...
We consider a nonlinear one-dimensional Stefan problem for a semi-infinite material x > 0, with phas...
The thesis is essentially devoted to prove existence results for some nonlinear partial differential...