Pages that link to "Item:Q1363047"
From MaRDI portal
The following pages link to Existence results for the quasistationary motion of a free capillary liquid drop (Q1363047):
Displaying 20 items.
- A justification for the thin film approximation of Stokes flow with surface tension (Q952525) (← links)
- On convergence of solutions to equilibria for quasilinear parabolic problems (Q1018390) (← links)
- Bianalytic stress-flow function in planar quasistationary problems of capillary hydrodynamics (Q1191182) (← links)
- On evolution equations for moving domains (Q1284526) (← links)
- Estimates of the solutions of the elastic system in a moving domain with free upper surface (Q1849016) (← links)
- Quasi-static motion of a capillary drop. II: The three-dimensional case. (Q1867235) (← links)
- On the problem of a steady fall of a drop in a liquid medium (Q1970008) (← links)
- On the justification of the quasistationary approximation in the problem of motion of a viscous capillary drop (Q1971101) (← links)
- Two-phase Stokes flow by capillarity in the plane: the case of different viscosities (Q2149896) (← links)
- On the Banach manifold of simple domains in the Euclidean space and applications to free boundary problems (Q2184833) (← links)
- A stable self-similar singularity of evaporating drops: ellipsoidal collapse to a point (Q2354685) (← links)
- On a multiphase multicomponent model of biofilm growth (Q2436327) (← links)
- Dynamic stability of equilibrium capillary drops (Q2453953) (← links)
- On Stokes flow with variable and degenerate surface tension coefficient (Q2487813) (← links)
- Model of an electro-rheological shock absorber and coupled problem for partial and ordinary differential equations with variable unknown domain (Q3603508) (← links)
- On the Cauchy problem for a capillary drop. Part I: irrotational motion (Q4213525) (← links)
- (Q4224966) (← links)
- A moving boundary problem for the Stokes equations involving osmosis: Variational modelling and short-time well-posedness (Q4594605) (← links)
- Quasi-static motion of a capillary drop. I: The two-dimensional case (Q5957789) (← links)
- Capillarity-driven Stokes flow: the one-phase problem as small viscosity limit (Q6056601) (← links)
