Discontinuous maps whose iterations are continuous

Abstract

Let X be a topological space and f:X X a bijection. Let C(X,f) be a set of integers such that an integer n is an element of C(X,f) if and only if the bijection fn:X X is continuous. A subset S of the set of integers Z is said to be realizable if there is a topological space X and a bijection f:X X such that S= C(X,f). A subset S of Z containing 0 is called a submonoid of Z if the sum of any two elements of S is also an element of S. We show that a subset S of Z is realizable if and only if S is a submonoid of Z. Then we generalize this result to any submonoid in any group.