On a free boundary problem for the stationary Navier-Stokes equations
On a model of rotating superfluids
We consider an energy-functional describing rotating superfluids at a rotating velocity , and prove similar results as for the Ginzburg-Landau functional of superconductivity: mainly the existence of branches of solutions with vortices, the existence of a critical above which energy-minimizers have vortices, evaluations of the minimal energy as a function of , and the derivation of a limiting free-boundary problem.
On a model of rotating superfluids
We consider an energy-functional describing rotating superfluids at a rotating velocity ω, and prove similar results as for the Ginzburg-Landau functional of superconductivity: mainly the existence of branches of solutions with vortices, the existence of a critical ω above which energy-minimizers have vortices, evaluations of the minimal energy as a function of ω, and the derivation of a limiting free-boundary problem.
On instability of axially symmetric equilibrium figures of rotating viscous incompressible liquid.
On Lichtenstein's analysis of rotating newtonian stars
On the bifurcation of flows of a heat-conducting fluid between two rotating permeable cylinders.
On the equation of a rotating film.
On two-dimensional and three dimensional axially-symmetric rotational flows of an ideal incompressible fluid
On Unsteady Boundary Layers In A Rotating Fluid With Time-Dependent Suction
On unsteady compressible laminar boundary layers past bodies of revolution spinning about its axis.
On unsteady two-phase fluid flow due to eccentric rotation of a disk.