Add to ORKGIn fluid dynamics, an interface splash singularity occurs when a locally smooth interface self-intersects in finite time. By means of elementary arguments, we prove that such a singularity cannot occur in finite time for vortex sheet evolution, i.e. for the two-phase incompressible Euler equations. We prove this by contradiction; we assume that a splash singularity does indeed occur in finite time. Based on this assumption, we find precise blow-up rates for the components of the velocity gradient which, in turn, allow us to characterize the geometry of the evolving interface just prior to self-intersection. The constraints on the geometry then lead to an impossible outcome, show...
This paper shows finite time singularity formation for the Muskat problem in a stable regime. The fr...
The initial-value problem for the evolution of the interface η(x, t) separating two unbounded, invis...
The initial-value problem for the evolution of the interface η(x, t) separating two unbounded, invis...
In fluid dynamics, an interface splash singularity occurs when a locally smooth interface s...
In fluid dynamics, an interface splash singularity occurs when a locally smooth interface s...
In fluid dynamics, an interface splash singularity occurs when a locally smooth interface s...
We show that so-called splash singularities cannot develop in the case of locally smooth solutions o...
We prove that the 3-D free-surface incompressible Euler equations with regular initial geometries an...
We exhibit smooth initial data for the two-dimensional (2D) water-wave equation for which we prove t...
We prove that the 3-D free-surface incompressible Euler equations with regular initial geom...
We prove that the 3-D free-surface incompressible Euler equations with regular initial geom...
In this paper, we prove the existence of smooth initial data for the 2D free boundary incompressible...
In this paper we discuss the existence of stationary incompressible fluids with splash singularities...
We prove that there are stationary solutions to the 2D incompressible free boundary Euler equations ...
Abstract. We show that ”splash ” singularities cannot develop in the case of locally smooth so-lutio...
This paper shows finite time singularity formation for the Muskat problem in a stable regime. The fr...
The initial-value problem for the evolution of the interface η(x, t) separating two unbounded, invis...
The initial-value problem for the evolution of the interface η(x, t) separating two unbounded, invis...
In fluid dynamics, an interface splash singularity occurs when a locally smooth interface s...
In fluid dynamics, an interface splash singularity occurs when a locally smooth interface s...
In fluid dynamics, an interface splash singularity occurs when a locally smooth interface s...
We show that so-called splash singularities cannot develop in the case of locally smooth solutions o...
We prove that the 3-D free-surface incompressible Euler equations with regular initial geometries an...
We exhibit smooth initial data for the two-dimensional (2D) water-wave equation for which we prove t...
We prove that the 3-D free-surface incompressible Euler equations with regular initial geom...
We prove that the 3-D free-surface incompressible Euler equations with regular initial geom...
In this paper, we prove the existence of smooth initial data for the 2D free boundary incompressible...
In this paper we discuss the existence of stationary incompressible fluids with splash singularities...
We prove that there are stationary solutions to the 2D incompressible free boundary Euler equations ...
Abstract. We show that ”splash ” singularities cannot develop in the case of locally smooth so-lutio...
This paper shows finite time singularity formation for the Muskat problem in a stable regime. The fr...
The initial-value problem for the evolution of the interface η(x, t) separating two unbounded, invis...
The initial-value problem for the evolution of the interface η(x, t) separating two unbounded, invis...