2020年11月20日 · "General Topology" by Stephen Willard is an excellent book that not only teaches you the concepts, but also the reason behind them. Unfortunately, Willard leaves too …

The following 3 volume set (translated from Russian, edited by A. V. Arhangelskii) deserves to be mentioned among references for general topology, too. It is part of Encyclopaedia of …

2015年3月5日 · A very good book for point set topology which emphasizes the connections with analysis and which is cheap is Albert Wilansky's ironically but appropriately titled Topology For …

2024年12月16日 · general-topology; Share. Cite. Follow asked Dec 16, 2024 at 10:41. David Gao David Gao. 20.6k 5 5 gold ...

2024年11月2日 · general-topology; Share. Cite. Follow asked Nov 2, 2024 at 3:29. Geoffrey Sangston Geoffrey Sangston ...

2024年12月6日 · Thus, there is a minimum topology compatible with $\leq$, namely, the right open ray topology, generated by the base $\{(x, \to):x\in X\}$. There is also a maximum …

2024年11月5日 · $\begingroup$ Or more generally, the right ray topology on any linear order with a non isolated greatest point (equivalently, left ray topology with a non isolated least point, as …

2024年12月29日 · general-topology; Share. Cite. Follow asked Dec 29, 2024 at 23:19. Carcassi Carcassi. 139 6 6 bronze ...

2016年11月20日 · Intuitively, the topology may be far too intricate for a sequence, which is a very small (only $\aleph_0$ long) and highly structured (i.e., it is linearly ordered), to be able to …

2024年11月19日 · $\begingroup$ I found a counterexample for ultraconnected spaces. It ended up being a quite long proof, and I've already nearly finished typing it up before my browser …