A Note of F-Topologies

## Introduction. In [ll] MARKOV introduced the concept of a free topological group F(X) on a topological space X and showed that, if X is any completely regular HAUSDORFF space, then F ( X ) exists, is HAUSDORFF, and the canonical (1964).

Let r= (AS' %, 6,, : nEN) be an inductive system on X. We denote by 8r the )9n+\* I Sn58nn).

An embeddable F 2 -geometry 1 with embedding rank er(1)=4 is given, which has no generating set of size 4. 2000 Academic Press ## 1. Introduction Let 1=(P, L) be a point-line geometry with points P and lines L ( P 3 ) (i.e., every line has three points). A subset S P is called a subgeometry of 1

This is a direct continuation of the authors paper [4], to which we refer for t,he notions and notations employed. (See also [I, 21 and [3].) I n § 6 of [4] we have shown that every pseudo-topology in the sense of G. CHOQUET can be considered as a limiting, and hence also as a t-maximal filter of pe

We show that if a 2-edge connected graph G has a unique f-factor F, then some vertex has the same degree in F as in G. This conclusion is the best possible, even if the hypothesis is considerably strengthened. 1. All graphs considered are finite but may contain loops and multiple edges. Let G be a