Well-posedness for a model of prion proliferation dynamics

We prove the existence of a global smooth solution to a viscous simplified Bardina turbulence model when the spacial dimension n satisfies 3 ≤ n ≤ 8.

Existence and uniqueness of weak solutions are shown for different models of the dynamic behavior of elastomers. The models are based on a nonlinear stressstrain relationship (satisfying a locally Lipschitz and affine domination property) and incorporate hysteretic effects as well. The results provi

## Communicated by B. Brosowski This paper concerns the well-posedness of the hydrodynamic model for semiconductor devices, a quasilinear elliptic-parbolic-hyperbolic system. Boundary conditions for elliptic and parabolic equations are Dirichlet conditions while boundary conditions for the hyperbo

## Abstract We prove local and global well‐posedness for the FENE dumbbell model for a very general class of potentials. Indeed, in prior local or global well‐posedness results, conditions on the strength of the singularity (or on the parameter __b__) were made. Here we give a proof in the general