In this paper, we develop an approach for establishing in some important cases, a conjecture made by De Giorgi more than 20 years ago. The problem originates in the theory of phase transition and is so closely connected to the theory of minimal hypersurfaces that it is sometimes referred to as “the
We consider the Allen–Cahn equation u +u 1− u2 =0 inRN. A celebrated conjecture by E. De ...
AbstractThe approach to oscillation theory developed by Gesztesy, Simon, and Teschl produces a sharp...
Abstract. We study the existence of a set with minimal perime-ter that separates two disjoint sets i...
A central problem in the area of PDEs is the study of global solutions, that is solutions defined in...
We study the G-convergence of functionals arising in the Van der Waals–Cahn–Hilliard theory of phase...
This book focuses on the vector Allen-Cahn equation, which models coexistence of three or more phase...
We study the symmetry of transition layers in Ginzburg-Landau type functionals for divergence-free m...
We establish an improvement of flatness result for critical points of Ginzburg-Landau energies with ...
Abstract. We use a Poincare ́ type formula and level set analysis to detect one-dimensional symmetry...
We study the one-dimensional symmetry of solutions to the nonlinear Stokes equation (Formula present...
International audienceWe study the one-dimensional symmetry of solutions to the nonlinear Stokes equ...
We use a Poincar\ue9 type formula and level set analysis to detect one-dimensional symmetry of stabl...
Abstract. We use a Poincaré type formula and level set analysis to detect one-dimensional symmetry o...
The approach to oscillation theory developed by Gesztesy, Simon, and Teschl produces a sharp version...
Abstract. The Nitsche conjecture is deeply rooted in the theory of doubly connected minimal surfaces...
We consider the Allen–Cahn equation u +u 1− u2 =0 inRN. A celebrated conjecture by E. De ...
AbstractThe approach to oscillation theory developed by Gesztesy, Simon, and Teschl produces a sharp...
Abstract. We study the existence of a set with minimal perime-ter that separates two disjoint sets i...
A central problem in the area of PDEs is the study of global solutions, that is solutions defined in...
We study the G-convergence of functionals arising in the Van der Waals–Cahn–Hilliard theory of phase...
This book focuses on the vector Allen-Cahn equation, which models coexistence of three or more phase...
We study the symmetry of transition layers in Ginzburg-Landau type functionals for divergence-free m...
We establish an improvement of flatness result for critical points of Ginzburg-Landau energies with ...
Abstract. We use a Poincare ́ type formula and level set analysis to detect one-dimensional symmetry...
We study the one-dimensional symmetry of solutions to the nonlinear Stokes equation (Formula present...
International audienceWe study the one-dimensional symmetry of solutions to the nonlinear Stokes equ...
We use a Poincar\ue9 type formula and level set analysis to detect one-dimensional symmetry of stabl...
Abstract. We use a Poincaré type formula and level set analysis to detect one-dimensional symmetry o...
The approach to oscillation theory developed by Gesztesy, Simon, and Teschl produces a sharp version...
Abstract. The Nitsche conjecture is deeply rooted in the theory of doubly connected minimal surfaces...
We consider the Allen–Cahn equation u +u 1− u2 =0 inRN. A celebrated conjecture by E. De ...
AbstractThe approach to oscillation theory developed by Gesztesy, Simon, and Teschl produces a sharp...
Abstract. We study the existence of a set with minimal perime-ter that separates two disjoint sets i...