It is proved that under suitable conditions the probability laws of two arbitrary solutions to a nonautonomous infinite dimensional stochastic equation with an additive noise converge to each other, as time goes to infinity, in the strong topology.
It is proved that under suitable conditions the probability laws of two arbitrary solutions to a nonautonomous infinite dimensional stochastic equation with an additive noise converge to each other, as time goes to infinity, in the strong topology. (en)