We consider a non-local phase transition equation set in a periodic medium and we construct solutions whose interface stays in a slab of prescribed direction and universal width. The solutions constructed also enjoy a local minimality property with respect to a suitable non-local energy functional
Equilibrium models based on a free energy functional deserve special interest in recent investigatio...
AbstractThe Ginzburg–Landau–Allen–Cahn equation is a variational model for phase coexistence and for...
We studied a nonlocal model for phase transition of Allen-Cahn type. At first, we used Direct Method...
We consider here a nonlocal phase transition energy in a periodic medium and we construct solutions ...
We consider a non-local phase transition equation set in a periodic medium and we construct solution...
We discuss some results related to a phase transition model in which the potential energy induced by...
We consider a functional related with phase transition models in the Heisenberg group framework. We ...
We consider a functional related with phase transition models in the Heisenberg group framework. We ...
We study minimizers of a nonlocal variational problem. The problem is a mathematical paradigm for th...
In recent years fractional operators have received considerable attention both in pure and applied m...
The Ginzburg-Landau-Allen-Cahn equation is a variational model for phase coexistence and for other p...
Many physical systems are modeled mathematically as variational problems, where the observed configu...
We consider a nonlocal version of the Allen-Cahn equation, which models phase transitions problems. ...
Survey on the existence of critical points of the Ginzburg-Landau energy with prescribed degrees. To...
AbstractWe consider, in a smooth bounded multiply connected domain D⊂R2, the Ginzburg–Landau energy ...
Equilibrium models based on a free energy functional deserve special interest in recent investigatio...
AbstractThe Ginzburg–Landau–Allen–Cahn equation is a variational model for phase coexistence and for...
We studied a nonlocal model for phase transition of Allen-Cahn type. At first, we used Direct Method...
We consider here a nonlocal phase transition energy in a periodic medium and we construct solutions ...
We consider a non-local phase transition equation set in a periodic medium and we construct solution...
We discuss some results related to a phase transition model in which the potential energy induced by...
We consider a functional related with phase transition models in the Heisenberg group framework. We ...
We consider a functional related with phase transition models in the Heisenberg group framework. We ...
We study minimizers of a nonlocal variational problem. The problem is a mathematical paradigm for th...
In recent years fractional operators have received considerable attention both in pure and applied m...
The Ginzburg-Landau-Allen-Cahn equation is a variational model for phase coexistence and for other p...
Many physical systems are modeled mathematically as variational problems, where the observed configu...
We consider a nonlocal version of the Allen-Cahn equation, which models phase transitions problems. ...
Survey on the existence of critical points of the Ginzburg-Landau energy with prescribed degrees. To...
AbstractWe consider, in a smooth bounded multiply connected domain D⊂R2, the Ginzburg–Landau energy ...
Equilibrium models based on a free energy functional deserve special interest in recent investigatio...
AbstractThe Ginzburg–Landau–Allen–Cahn equation is a variational model for phase coexistence and for...
We studied a nonlocal model for phase transition of Allen-Cahn type. At first, we used Direct Method...
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