Pages that link to "Item:Q2022667"

The following pages link to Weak solutions obtained by the vortex method for the 2D Euler equations are Lagrangian and conserve the energy (Q2022667):

Displaying 6 items.

• Lagrangian solutions to the 2D Euler system with \(L^1\) vorticity and infinite energy (Q900893) (← links)
• On the advection-diffusion equation with rough coefficients: weak solutions and vanishing viscosity (Q2085760) (← links)
• Energy conservation for 2D Euler with vorticity in \(L(\log L)^\alpha\) (Q2129667) (← links)
• Strong convergence of the vorticity for the 2D Euler equations in the inviscid limit (Q2662028) (← links)
• A directional Lipschitz extension lemma, with applications to uniqueness and Lagrangianity for the continuity equation (Q5164840) (← links)
• \(L^2\)-critical nonuniqueness for the 2D Navier-Stokes equations (Q6054297) (← links)