The mapping i2 on the free paratopological groups

Abstract

Let FP(X) be the free paratopological group over a topological space X. For each non-negative integer n∈N, denote by FPn(X) the subset of FP(X) consisting of all words of reduced length at most n, and in by the natural mapping from (X X-1\e\)n to FPn(X). In this paper, we mainly improve some results of A.S. Elfard and P. Nickolas's [On the topology of free paratopological groups. II, Topology Appl., 160(2013), 220--229.]. The main result is that the natural mapping i2: (X Xd-1\e\)2 FP2(X) is a closed mapping if and only if every neighborhood U of the diagonal 1 in Xd× X is a member of the finest quasi-uniformity on X, where X is a T1-space and Xd denotes X when equipped with the discrete topology in place of its given topology.