Abstract. Conservation laws with a random noise, serve as model to study the influence of random effects on convective problems. An important example is the case of subsurface flow through porous media. As a model, we study the Cauchy problem for a conservation law with a random noise, i.e., ∂
In this work we present examples of the effects of noise on the solution of a partial differential e...
When simulating two-phase flow in a porous medium, numerical methods are used to solve the equations...
Fehrman B, Gess B. Path-by-path well-posedness of nonlinear diffusion equations with multiplicative ...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
We show that the Cauchy Problem for a randomly forced, periodic multi-dimensional scalar first-order...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
Abstract. A change of variables is introduced to reduce certain nonlinear stochastic evolution equat...
We consider conservation laws with discontinuous flux where the initial datum, the flux function, an...
We develop a pathwise theory for scalar conservation laws with quasilinear multiplicative rough path...
We consider conservation laws with discontinuous flux where the initial datum, the flux function, an...
The Aw–Rascle–Zhang traffic model, a model of sedimentation, and other applications lead to nonlinea...
Gess B. Random attractors for stochastic porous media equations perturbed by space-time linear multi...
We are interested here in multi-dimensional nonlinear scalar conservation laws forced by a multiplic...
Chouk K, Gess B. Path-by-path regularization by noise for scalar conservation laws. Journal of Funct...
These lecture notes presents very recent progresses on the problem of the improvements of well posed...
In this work we present examples of the effects of noise on the solution of a partial differential e...
When simulating two-phase flow in a porous medium, numerical methods are used to solve the equations...
Fehrman B, Gess B. Path-by-path well-posedness of nonlinear diffusion equations with multiplicative ...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
We show that the Cauchy Problem for a randomly forced, periodic multi-dimensional scalar first-order...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
Abstract. A change of variables is introduced to reduce certain nonlinear stochastic evolution equat...
We consider conservation laws with discontinuous flux where the initial datum, the flux function, an...
We develop a pathwise theory for scalar conservation laws with quasilinear multiplicative rough path...
We consider conservation laws with discontinuous flux where the initial datum, the flux function, an...
The Aw–Rascle–Zhang traffic model, a model of sedimentation, and other applications lead to nonlinea...
Gess B. Random attractors for stochastic porous media equations perturbed by space-time linear multi...
We are interested here in multi-dimensional nonlinear scalar conservation laws forced by a multiplic...
Chouk K, Gess B. Path-by-path regularization by noise for scalar conservation laws. Journal of Funct...
These lecture notes presents very recent progresses on the problem of the improvements of well posed...
In this work we present examples of the effects of noise on the solution of a partial differential e...
When simulating two-phase flow in a porous medium, numerical methods are used to solve the equations...
Fehrman B, Gess B. Path-by-path well-posedness of nonlinear diffusion equations with multiplicative ...