By introducing the general notion of nonwandering operator semigroup T(t) and utilizing a basic result in normed linear space,the nonwandering property of T(t)=e~(tA) is investigated with the constructive method.

It is proved that Poisson-stable points are dense in the locally compact phase space X if and only if non-wandering points are dense in the X.

This article discusses a few important point sets: wandering point set,non-wandering point set and recurrence point set in a topological dynamical system,obtains the equivalence definitions and proofs of wandering point set and non-wandering point set,as well as the equivalence and its proof of several point set.

It is proved that the set M_1 of all nonwandering points in the phase space X can be represented by [∪x∈Xω(x)] if the latter attracts each point of X.

(2) Let T-O=∪n 0j=1I j, then for any j 0∈{1,2,…,n}, every connected component C of (T- P(f) )∩I j 0  has at most one nonwandering point with infinte orbit.

(2) Each isolated periodic point of f is an isolated nonwandering point of f.

This paper investigates the pointwise pseudo-orbit tracing property on the non-wandering set.

Here we study the topological structure of non-wandering set of self-continuous map on Y-space,we prove that for any x∈Yand x∈W(f)-P(f),then x∈Ω～(f).

Invariance of one class of nonwandering operator under small perturbation;

Criterion and several properties of nonwandering operators;

Existence of nonwandering operator in infinite demensional separable Banach sequence space;