Add to ORKGWe study the ‘‘generalized’ ’ Dirichlet problem (in the sense of viscosity solutions) for quasilinear elliptic and parabolic equations in the case when losses of boundary conditions can actually occur. We prove for such problems comparison results between semicontinuous viscosity sub- and super-solutions (Strong Comparison Principle) in annular domains. As a consequence of the Strong Comparison Principle and the Perron’s method we obtain the existence and the uniqueness of a continuous solution. Our approach allow us to handle also the case of ‘‘singular’ ’ equations, in particular the geo-metric equations arising in the level-sets approach for defining the motions of hypersurfaces with different types of normal velocities. We are able to p...
We derive a strong maximum principle for upper semicontinuous viscosity subsolutions of fully nonlin...
We deal with fully nonlinear second-order equations assuming a superlinear growth in u with the aim...
We deal with fully nonlinear second-order equations assuming a superlinear growth in u with the aim ...
Abstract. We prove two di®erent types of comparison results be-tween semicontinuous viscosity sub- a...
We prove two different types of comparison results between semicontinuous viscosity sub- and superso...
We collect examples of boundary-value problems of Dirichlet and Dirichlet–Neumann type which we foun...
AbstractWe are concerned with fully nonlinear possibly degenerate elliptic partial differential equa...
summary:In the present paper we study the Dirichlet boundary value problem for quasilinear elliptic ...
Abstract. In the present paper we study the Dirichlet boundary value pro-blem for quasilinear ellipt...
In this paper we prove the comparison principle for viscosity solutions of second order, degenerate ...
We prove a comparison theorem for viscosity solutions of singular degenerate parabolic equations wit...
In this article, we consider three types of solutions in Orlicz spaces for the quasilinear elliptic...
We study partial differential equations of Monge-Amp\ue8re type involving the derivates with respect...
AbstractWe prove comparison results between viscosity sub- and supersolutions of degenerate elliptic...
In this article, we introduce a new approach for proving Maximum Principle type results for viscosit...
We derive a strong maximum principle for upper semicontinuous viscosity subsolutions of fully nonlin...
We deal with fully nonlinear second-order equations assuming a superlinear growth in u with the aim...
We deal with fully nonlinear second-order equations assuming a superlinear growth in u with the aim ...
Abstract. We prove two di®erent types of comparison results be-tween semicontinuous viscosity sub- a...
We prove two different types of comparison results between semicontinuous viscosity sub- and superso...
We collect examples of boundary-value problems of Dirichlet and Dirichlet–Neumann type which we foun...
AbstractWe are concerned with fully nonlinear possibly degenerate elliptic partial differential equa...
summary:In the present paper we study the Dirichlet boundary value problem for quasilinear elliptic ...
Abstract. In the present paper we study the Dirichlet boundary value pro-blem for quasilinear ellipt...
In this paper we prove the comparison principle for viscosity solutions of second order, degenerate ...
We prove a comparison theorem for viscosity solutions of singular degenerate parabolic equations wit...
In this article, we consider three types of solutions in Orlicz spaces for the quasilinear elliptic...
We study partial differential equations of Monge-Amp\ue8re type involving the derivates with respect...
AbstractWe prove comparison results between viscosity sub- and supersolutions of degenerate elliptic...
In this article, we introduce a new approach for proving Maximum Principle type results for viscosit...
We derive a strong maximum principle for upper semicontinuous viscosity subsolutions of fully nonlin...
We deal with fully nonlinear second-order equations assuming a superlinear growth in u with the aim...
We deal with fully nonlinear second-order equations assuming a superlinear growth in u with the aim ...