AbstractWe implement variational techniques and an implicit function theorem to derive constraints on angular velocity under which we may verify the existence, boundary regularity, and stability of an energy-minimising family of rotating liquid drops in a neighbourhood of the closed unit ball in Rn+1
AbstractA constructive existence proof is given for a dumbbell-shaped solution near the two-sphere l...
AbstractIn this paper, minimization problems in L1(R3) are considered. These problems arise in astro...
Tesis doctoral inédita. Universidad Autónoma de Madrid, Facultad de Ciencias, Departamento de Matemá...
We implement variational techniques and an implicit function theorem to derive constraints on angula...
AbstractWe implement variational techniques and an implicit function theorem to derive constraints o...
We establish sufficient conditions for uniqueness in the context of an energy minimisation property ...
The behavior of rotating and/or charged drops is a classic problem in fluid mechanics with a multitu...
Here we consider the problem of a fluid body rotating with a constant angular velocity and subjected...
The stability and symmetry breaking bifurcation of a planar liquid drop is studied using the energy-...
In this paper, the stability of a rotating drop held together by surface tension is investigated by ...
We consider a rotating inviscid liquid drop trapped between two parallel plates. The liquid–air inte...
We study the evolution of a viscous fluid drop rotating about a fixed axis at constant angular veloc...
We prove the existence of a family of volume-constrained critical points of the liquid drop function...
AbstractIn this paper we classify the free boundary associated to equilibrium configurations of comp...
We consider a classical problem of stability of equilibrium figures of a liquid rotating uniformly a...
AbstractA constructive existence proof is given for a dumbbell-shaped solution near the two-sphere l...
AbstractIn this paper, minimization problems in L1(R3) are considered. These problems arise in astro...
Tesis doctoral inédita. Universidad Autónoma de Madrid, Facultad de Ciencias, Departamento de Matemá...
We implement variational techniques and an implicit function theorem to derive constraints on angula...
AbstractWe implement variational techniques and an implicit function theorem to derive constraints o...
We establish sufficient conditions for uniqueness in the context of an energy minimisation property ...
The behavior of rotating and/or charged drops is a classic problem in fluid mechanics with a multitu...
Here we consider the problem of a fluid body rotating with a constant angular velocity and subjected...
The stability and symmetry breaking bifurcation of a planar liquid drop is studied using the energy-...
In this paper, the stability of a rotating drop held together by surface tension is investigated by ...
We consider a rotating inviscid liquid drop trapped between two parallel plates. The liquid–air inte...
We study the evolution of a viscous fluid drop rotating about a fixed axis at constant angular veloc...
We prove the existence of a family of volume-constrained critical points of the liquid drop function...
AbstractIn this paper we classify the free boundary associated to equilibrium configurations of comp...
We consider a classical problem of stability of equilibrium figures of a liquid rotating uniformly a...
AbstractA constructive existence proof is given for a dumbbell-shaped solution near the two-sphere l...
AbstractIn this paper, minimization problems in L1(R3) are considered. These problems arise in astro...
Tesis doctoral inédita. Universidad Autónoma de Madrid, Facultad de Ciencias, Departamento de Matemá...