In this paper we review many aspects of the well-posedness theory for the Cauchy problem for the continuity and transport equations and for the ordinary differential equation (ODE). In this framework, we deal with velocity fields that are not smooth, but enjoy suitable ‘weak differentiability' assumptions. We first explore the connection between the partial differential equation (PDE) and the ODE in a very general non-smooth setting. Then we address the renormalization property for the PDE and prove that such a property holds for Sobolev velocity fields and for bounded variation velocity fields. Finally, we present an approach to the ODE theory based on quantitative estimate
This (Diplom-) thesis deals with the particle trajectories of an incompressible and ideal fluid flow...
We show that vector fields $b$ whose spatial derivative $D_xb$ satisfies a Orlicz summability condit...
In this paper linear stochastic transport and continuity equations with drift in critical Lp spaces ...
We present an informal review of some concepts and results from the theory of ordinary differential ...
We consider the Cauchy problem for the continuity equation in space dimension $d ge 2$. We construct...
We consider the Cauchy problem for the continuity equation in space dimension $d ge 2$. We construct...
We consider the mixing behavior of the solutions to the continuity equation associated with a diverg...
We consider the mixing behaviour of the solutions of the continuity equation associated with a diver...
AbstractWe consider the one-dimensional ordinary differential equation with a vector field which is ...
We prove quantitative estimates for flows of vector fields subject to anisotropic regularity conditi...
We consider the continuity equation with a nonsmooth vector field and a damping term. In their funda...
In the first part of this paper we establish a uniqueness result for continuity equations with veloc...
These notes collect the lectures given by the first author in Toulouse, April 2014, on the well-pose...
In this paper linear stochastic transport and continuity equations with drift in critical Lp spaces ...
We consider continuous solutions u to the balance equation ∂t u(t, x) + ∂x [f (u(t, x))] = g(t, x) ...
This (Diplom-) thesis deals with the particle trajectories of an incompressible and ideal fluid flow...
We show that vector fields $b$ whose spatial derivative $D_xb$ satisfies a Orlicz summability condit...
In this paper linear stochastic transport and continuity equations with drift in critical Lp spaces ...
We present an informal review of some concepts and results from the theory of ordinary differential ...
We consider the Cauchy problem for the continuity equation in space dimension $d ge 2$. We construct...
We consider the Cauchy problem for the continuity equation in space dimension $d ge 2$. We construct...
We consider the mixing behavior of the solutions to the continuity equation associated with a diverg...
We consider the mixing behaviour of the solutions of the continuity equation associated with a diver...
AbstractWe consider the one-dimensional ordinary differential equation with a vector field which is ...
We prove quantitative estimates for flows of vector fields subject to anisotropic regularity conditi...
We consider the continuity equation with a nonsmooth vector field and a damping term. In their funda...
In the first part of this paper we establish a uniqueness result for continuity equations with veloc...
These notes collect the lectures given by the first author in Toulouse, April 2014, on the well-pose...
In this paper linear stochastic transport and continuity equations with drift in critical Lp spaces ...
We consider continuous solutions u to the balance equation ∂t u(t, x) + ∂x [f (u(t, x))] = g(t, x) ...
This (Diplom-) thesis deals with the particle trajectories of an incompressible and ideal fluid flow...
We show that vector fields $b$ whose spatial derivative $D_xb$ satisfies a Orlicz summability condit...
In this paper linear stochastic transport and continuity equations with drift in critical Lp spaces ...
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