On a paradoxical property of the shifting mapping on an infinite-dimensional tori

Abstract: An infinite-dimensional torus T∞=lp/2πZ∞, where lp, p ≥ 1 – space of sequences, Z∞ – natural integer lattice in lp, is considered. We study the classical question in the theory of dynamical systems about the behavior of trajectories of a shift mapping on the specified torus. More precisely, some sufficient conditions are proposed that guarantee the emptiness of the ω-limit and α-limit sets of any of the shift mapping onto T∞.