Add to ORKGWe present evidence on global existence of solutions of De Gregorio's equation, based on numerical computation and a mathematical criterion analogous to the Beale-Kato-Majda theorem. Its meaning in the context of a generalized Constantin-Lax-Majda equation will be discussed. We then argue that the convection term can deplete solutions of blow-up.
We study initial boundary value problems for the convective Cahn-Hilliard equation $____Dt u +____px...
Generalized Kelvin-Voigt equations governing nonhomogeneous and incompressible fluids are considere...
International audienceThis article consists of a detailed geometric study of the one-dimensional vo...
We present evidence on global existence of solutions of De Gregorio's equation, based on numerical c...
We present evidence on global existence of solutions of De Gregorio's equation, based on numerical c...
We study a generalization due to De Gregorio and Wunsch et al of the Constantin–Lax–Majda equation (...
We study a generalization due to De Gregorio and Wunsch et al of the Constantin–Lax–Majda equation (...
AbstractSolutions of nonlinear (possibly degenerate) reaction-diffusion models are known to exist fo...
AbstractSolutions of nonlinear (possibly degenerate) reaction-diffusion models are known to exist fo...
We study the impact of the convective terms on the global solvability or finite time blow up of solu...
We study the impact of the convective terms on the global solvability or finite time blow up of solu...
AbstractWe will discuss a new integrable model which describes the motion of fluid. The present work...
AbstractIn this paper we study several qualitative properties of the Degasperis–Procesi equation. We...
AbstractThis paper is concerned with global existence and blow-up phenomena for the weakly dissipati...
We study a new class of ordinary differential equations with blow up solutions. Necessary and suffi...
We study initial boundary value problems for the convective Cahn-Hilliard equation $____Dt u +____px...
Generalized Kelvin-Voigt equations governing nonhomogeneous and incompressible fluids are considere...
International audienceThis article consists of a detailed geometric study of the one-dimensional vo...
We present evidence on global existence of solutions of De Gregorio's equation, based on numerical c...
We present evidence on global existence of solutions of De Gregorio's equation, based on numerical c...
We study a generalization due to De Gregorio and Wunsch et al of the Constantin–Lax–Majda equation (...
We study a generalization due to De Gregorio and Wunsch et al of the Constantin–Lax–Majda equation (...
AbstractSolutions of nonlinear (possibly degenerate) reaction-diffusion models are known to exist fo...
AbstractSolutions of nonlinear (possibly degenerate) reaction-diffusion models are known to exist fo...
We study the impact of the convective terms on the global solvability or finite time blow up of solu...
We study the impact of the convective terms on the global solvability or finite time blow up of solu...
AbstractWe will discuss a new integrable model which describes the motion of fluid. The present work...
AbstractIn this paper we study several qualitative properties of the Degasperis–Procesi equation. We...
AbstractThis paper is concerned with global existence and blow-up phenomena for the weakly dissipati...
We study a new class of ordinary differential equations with blow up solutions. Necessary and suffi...
We study initial boundary value problems for the convective Cahn-Hilliard equation $____Dt u +____px...
Generalized Kelvin-Voigt equations governing nonhomogeneous and incompressible fluids are considere...
International audienceThis article consists of a detailed geometric study of the one-dimensional vo...