Sensitivity and transitivity for the induced maps on symmetric product suspensions of a topological space

Abstract

Given a nondegenerate compact perfect and Hausdorff topological space X,n∈ N and a function f:X→ X, we consider the n-fold symmetric product of X, Fn(X) and the induced function Fn(f):Fn(X)→ Fn(X). If n≥2, we consider the n-fold symmetric product suspension of X, SFn(X) and the induced functionSFn(f):SFn(X)→ SFn(X). In this paper, we study the relationships between the following statements: (1) f∈ M,(2) Fn(f)∈ M, and (3)SFn(f)∈ M, where M is one of the following classes of map: sensitive, cofinitely sensitive, multi-sensitive, Z-transitive, quasi-periodic, accessible, indecomposable, multi-transitive, -transitive, -mixing, Martelli's chaos, Transitive, F-system, TT++, Touhey, two-sided transitive, fully exact, strongly transitive. These results improve and extend some existing ones.