On the advection-diffusion equation with rough coefficients: Weak solutions and vanishing viscosity

We deal with the vanishing viscosity scheme for the transport/continuity equation ∂tu+div(ub)=0 drifted by a divergence-free vector field b. Under general Sobolev assumptions on b, we show the convergence of such scheme to the unique Lagrangian solution of the transport equation. Our proof is based...

ver descrição completa

Detalhes bibliográficos
Autores: Bonicatto, P., Ciampa, G., Crippa, G.
Formato: artículo
Estado:Versión publicada
Fecha de publicación:2022
País:España
Recursos:Basque Center for Applied Mathematics (BCAM)
Repositorio:BIRD. BCAM's Institutional Repository Data
OAI Identifier:oai:bird.bcamath.org:20.500.11824/1633
Acesso em linha:http://hdl.handle.net/20.500.11824/1633
Access Level:acceso abierto
Palavra-chave:Advection-diffusion equation
Anomalous dissipation
Regular/Stochastic Lagrangian flow
Transport/continuity equation
Uniqueness
Vanishing viscosity
Descrição
Resumo:We deal with the vanishing viscosity scheme for the transport/continuity equation ∂tu+div(ub)=0 drifted by a divergence-free vector field b. Under general Sobolev assumptions on b, we show the convergence of such scheme to the unique Lagrangian solution of the transport equation. Our proof is based on the use of stochastic flows and yields quantitative rates of convergence. This offers a completely general selection criterion for the transport equation (even beyond the distributional regime) which compensates the wild non-uniqueness phenomenon for solutions with low integrability arising from convex integration constructions, as shown in recent works [8,28–30], and rules out the possibility of anomalous dissipation.