Attractors of stochastic lattice dynamical systems with a multiplicative noise and non-Lipschitz nonlinearities (Q432450)

The paper considers the stochastic lattice differential equations NEWLINE\[NEWLINE {{du_i}\over{dt}} = \nu(u_{i-1}-2u_i+u_{i+1}) - f_i(u_i) + \sum_1^Nc_ju_i \circ{{dw_j}\over{dt}}\;,\;i\in \mathbb{Z} NEWLINE\]NEWLINE, where \(f_i:\mathbb{R}\mapsto \mathbb{R}\) are assumed to satisfy certain growth and dissipativeness conditions without being Lipschitz, \(\nu>0\), \(w_j\) are mutually independent Brownian motions and \(\circ\) is understood in the sense of Stratonovich.NEWLINENEWLINEThe paper develops the theory of multi-valued random dynamical systems and proves the existence of a random compact global attractor.