On the asymptotic behavior of dynamical maps for a finite quantum system

The uniform asymptotical behavior of nonautonomous dynamical systems and their attractors is investigated. In particular, it is shown that parametrically inflated pullback attractors are uniformly forward attracting and, also that, under appropriate conditions, the component sets of the pullback att

We study a second order ordinary differential equation which is the EulerLagrange equation of the energy functional for maps with prescribed rotational symmetry. We obtain Liouville's type theorems for symmetric harmonic maps into ellipsoids, Euclidean and Hyperbolic spaces, and existence results as

In this paper, we consider the weak and strong convergence of implicit iteration process to a common fixed point of I-asymptotically nonexpansive mappings. The main results extend to a finite family of I-asymptotically nonexpansive mappings in a Banach space.