An existence and uniqueness theorem for the Vlasov-Maxwell system

## Communicated by A. Piskorek In this paper we consider a problem of non-linear inelasticity. The global in the time existence and uniqueness for the Chan-Bodner-Lindholm model is proved. The idea of the proof is based on the non-linear semigroup method.

We propose a result of local existence and uniqueness of a mild solution to the one-dimensional Vlasov-Poisson system. We establish the result for an initial condition lying in the space W 1,1 (R 2 ), then we extend it to initial conditions lying in the space BV(R 2 ), without any assumption of cont

## Abstract We study the well posedness of boundary value problems for elastic cusped prismatic shells in the __N__th approximation of I. Vekua's hierarchical models under (all reasonable) boundary conditions at the cusped edge and given displacements at the non‐cusped edge and stresses at the uppe

## Abstract We prove the global existence of weak solutions to the Vlasov–Darwin system in R3 for small initial data. The Vlasov–Darwin system is an approximation of the Vlasov–Maxwell model which is valid when the characteristic speed of the particles is smaller than the light velocity, but not to

## Abstract A collisionless plasma is modelled by the Vlasov–Poisson system in one dimension. We consider the situation in which mobile negative ions balance a fixed background of positive charge, which is independent of space and time, as ∣__x__∣ → ∞. Thus, the total positive charge and the total