Abstract:
In this paper we consider the multi-water-bag model for collisionless kinetic equations.
The multi-water-bag representation of the statistical distribution function of particles can be viewed as
a special class of exact weak solution of the Vlasov equation, allowing to reduce this latter into
a set of hydrodynamic equations while keeping its kinetic character.
After recalling the link of the multi-water-bag model with kinetic formulation
of conservation laws, we derive different multi-water-bag (MWB) models, namely the Poisson-MWB,
the quasineutral-MWB and the electromagnetic-MWB models. These models are very promising because
they reveal to be very useful for the theory and numerical simulations of laser-plasma and gyrokinetic physics.
In this paper we prove some existence and uniqueness results for classical solutions of these different models.
We next propose numerical schemes based on Discontinuous Garlerkin methods to solve these equations.
We then present some numerical simulations of non linear problems arising in plasma physics for which we
know some analytical results.