In our paper [O] the proof of Theorem 2.7 is not correct. In that proof we constructed a space X × X and said that it had a subspace Z that was not weakly Whyburn. In fact X × X is regular and scattered, hence by Corollary 2.9 [TY] hereditarily weakly Whyburn. Thus the following problem raised in [TY] remains open: are sequential spaces hereditarily weakly Whyburn? We will now describe a Hausdorff counterexample to this problem, hence what remains open is the questions does there exist a sequential Tychonoff (or even regular) space that is not hereditarily weakly Whyburn.
Corrigendum to: "Some notes on weakly Whyburn spaces'' [Topology Appl. 128 (2003), no. 2-3, 257–262] / Obersnel, Franco. - In: TOPOLOGY AND ITS APPLICATIONS. - ISSN 0166-8641. - STAMPA. - 138:(2004), pp. 323-324. [10.1016/j.topol.2003.11.003]
Corrigendum to: "Some notes on weakly Whyburn spaces'' [Topology Appl. 128 (2003), no. 2-3, 257–262]
OBERSNEL, Franco
2004-01-01
Abstract
In our paper [O] the proof of Theorem 2.7 is not correct. In that proof we constructed a space X × X and said that it had a subspace Z that was not weakly Whyburn. In fact X × X is regular and scattered, hence by Corollary 2.9 [TY] hereditarily weakly Whyburn. Thus the following problem raised in [TY] remains open: are sequential spaces hereditarily weakly Whyburn? We will now describe a Hausdorff counterexample to this problem, hence what remains open is the questions does there exist a sequential Tychonoff (or even regular) space that is not hereditarily weakly Whyburn.Pubblicazioni consigliate
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
