SRB measures for non-hyperbolic systems with multidimensional expansion

In the present section we state and prove our main result, concerning local existence and finite propagation speed for hyperbolic systems which are microlocally symmetrizable, in

The proposition follows from the projective invariance of the hyperbolic metric and of the polarity relation under projective transformations leaving ∆ invariant, since one can

[1] L. De Lellis, Well-posedness for a class of hyper- bolic systems of conservation laws in several space dimensions, Comm. Piccoli, Uniqueness of classical and nonclassi-

Said-Houari, Global nonexistence of positive initial- energy solutions of a system of nonlinear viscoelastic wave equations with damp- ing and source terms, J. Messaoudi

In second chapter, we proved the well-posedness and an exponential decay result under a suitable assumptions on the weight of the damping and the weight of the delay for a wave

We show that for a large class of maps on manifolds of arbitrary finite dimension, the existence of a Gibbs–Markov–Young structure (with Lebesgue as the reference measure) is

The present paper has been devoted to develop criteria based on stochastic Lyapunov technique in order to establish sufficient conditions for the existence of invariant

We have the following dyadic characterization of these spaces (see [13, Prop. As a matter of fact, operators associated to log-Zygmund or log- Lipschitz symbols give a logarithmic