Add to ORKGAnalytic global bifurcation theory is used to construct a large variety of families of steady periodic two-dimensional gravity water waves with real-analytic vorticity distributions, propagating in an incompressible fluid. The waves that are constructed can possess an arbitrary number of interior stagnation points in the fluid and corresponding critical layers consisting of closed streamlines. This is made possible by the use of the so-called naive flattening transform, which has previously only been used for local bifurcation. Read More: https://epubs.siam.org/doi/10.1137/19M127484
We study the mathematical theory of water waves. Local bifurcation theory is also discussed, includi...
We study the mathematical theory of water waves. Local bifurcation theory is also discussed, includi...
We construct three-dimensional families of small-amplitude gravity-driven rotational steady water wa...
We establish the existence of small-amplitude uni- and bimodal steady periodic gravity waves with an...
We study steady periodic water waves with variable vorticity and density, where we allow for stagnat...
AbstractWe use bifurcation theory to construct small periodic gravity stratified water waves with de...
Plane progressive waves on water of finite or infinite depth are treated under the effect of both gr...
Numerical work of many people on the bifurcations of uniformly travelling water waves (two-dimension...
A vortex sheet formulation of irrotational, incompressible Euler flow is used to compute periodic tr...
We consider the classical water wave problem described by the Euler equations with a free surface un...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
A generalization of criticality - called secondary criticality - is introduced and applied to finite...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
A generalization of criticality – called secondary criticality – is introduced and applied to finite...
A generalization of criticality – called secondary criticality – is introduced and applied to finite...
We study the mathematical theory of water waves. Local bifurcation theory is also discussed, includi...
We study the mathematical theory of water waves. Local bifurcation theory is also discussed, includi...
We construct three-dimensional families of small-amplitude gravity-driven rotational steady water wa...
We establish the existence of small-amplitude uni- and bimodal steady periodic gravity waves with an...
We study steady periodic water waves with variable vorticity and density, where we allow for stagnat...
AbstractWe use bifurcation theory to construct small periodic gravity stratified water waves with de...
Plane progressive waves on water of finite or infinite depth are treated under the effect of both gr...
Numerical work of many people on the bifurcations of uniformly travelling water waves (two-dimension...
A vortex sheet formulation of irrotational, incompressible Euler flow is used to compute periodic tr...
We consider the classical water wave problem described by the Euler equations with a free surface un...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
A generalization of criticality - called secondary criticality - is introduced and applied to finite...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
A generalization of criticality – called secondary criticality – is introduced and applied to finite...
A generalization of criticality – called secondary criticality – is introduced and applied to finite...
We study the mathematical theory of water waves. Local bifurcation theory is also discussed, includi...
We study the mathematical theory of water waves. Local bifurcation theory is also discussed, includi...
We construct three-dimensional families of small-amplitude gravity-driven rotational steady water wa...