The nice thing about colleagues is that, sometimes, they give me a primer on their latest results. I would like to talk about a strange result by Dongsheng Zhao and Xiaoyong Xi, which, while accepted for publication, does not seem to be out yet. (Thanks to D. Zhao for letting me know about this!) I have already talked about models of topological spaces. Following earlier results by Zhao, Xi, and Erné, one can show that every T_{1} space has a bounded complete, and even algebraic, *poset* model, and that every T_{1} space has a (not bounded complete) *dcpo* model, but can we have both at the same time? In other words, does every T_{1} space have a bounded complete dcpo model? Answer (and explanations) in the full post…

# Coherence of Dcpos

It had been a long time since I wanted to explain a nifty result by Jia, Jung, and Li (2016), which gives a simple test for whether a given well-filtered dcpo is coherent. The proof, in particular, is extremely nifty. Read the full post.

# Open Problems

There are a few questions that I would like to solve, and I’ve decided to share them with you. See the new open problems page. I am starting with three questions now, but I will update that from time to time. Some of these problems are pretty tough, and I’m asking for help here. Some others are more doable, and indeed would be nice subjects for brilliant young M2 or PhD students.

# Pointwise directed families of maps

Happy New Year 2017! Sorry I have not posted for some time… Today, let me talk about a curious construction of Lawson and Xi on families of continuous maps that are not directed, rather *pointwise directed*. They use that to show that the dcpo of all Scott-continuous maps from a core-compact, core-coherent space to an **RB**-domain is a continuous dcpo; but the idea of pointwise directed families of maps, and the way they use it to find a basis of dcpos of continuous maps, is intriguing. Read the full post.

# Some new, easy facts on consonant spaces

Last time, we had stated and proved the Dolecki-Greco-Lechicki theorem: every regular Čech-complete space is consonant. I would like to show that there are some other classes of consonant spaces, among T_{0} spaces. The results are going to be easy consequences of results from the book. Read the full post.

# The Dolecki-Greco-Lechicki Theorem

I have met Szymon Dolecki at the Summer Topology Conference 2016, and he is a charming person. In 1995, with Gabriele Greco and Alojzy Lechicki, he proved a very nice theorem — every Čech-complete space is consonant — that deserves to be well-known. As a coincidence, this very theorem was mentioned by Jimmie Lawson at the same conference. It is also the subject of Exercise 8.3.4 in the book, but I am afraid that, as stated, it is way too hard. My purpose here is to give a complete solution to the exercise. The proof is elementary, that is, it does not require any deep knowledge of topology. Read the full post.

# Summer Topology Conference 2016

I have already said I would be at the Galway Colloquium in Leicester, UK, on Monday, August 1st, 2016. Right after that, I will participate to the 2016 Summer Topology Conference—same place, from Tuesday to Friday.

I will give a talk on Noetherian spaces. They form Section 9.7 of the book, and I will try to make an accessible introduction to the view expounded there, that they form a natural topological generalization of the notion of well-quasi-ordering. The *pièce de résistance* will be the topological Higman lemma, of which I will attempt to give a complete proof during the talk. I will also talk about applications in computer science, finite representations of open and closed subsets, and the curious case of the powerset of a Noetherian space. You can find the slides here. See you there!

# Galway Colloquium 2016

I will be at the Galway Colloquium at Leicester, UK, on Monday, August 1st, 2016. I will give an introduction to T_{0} topology and domain theory there, aimed mostly at students in mathematics.

I will try to illustrate some of the key concepts in the field by progressing through a proof of Dana S. Scott’s theorem (1972) that the injective T_{0} spaces are the continuous lattices. This will be an opportunity to touch various subjects: dcpos, the specialization ordering, Sierpiński space, retracts, Stone duality, sober spaces and sobrification, b-spaces and algebraic posets, c-spaces and continuous posets, notably.

Have a look at the slides! Note that there are several grayed areas, which hide some of the proofs. This is on purpose: I am expecting the attendees to find the missing arguments by themselves. If you plan to come to Leicester, you may try to think about them in advance. Otherwise, have fun and try to find the arguments by yourselves! Note that most of the material is scattered through the book, too…

# Locales, sublocales III: the frame of nuclei

My goal today is to describe two elegant proofs of the fact that nuclei form a frame. There are many proofs of that.

The main difficulty is that, while meets (infima) of nuclei are taken pointwise, joins (suprema) are much harder to describe. That is certainly an obstacle if one ever tries to prove that binary meets distribute over joins. A similar difficulty occurs with sublocales.

I will present a short proof due to Picado and Pultr, using sublocales. I will also present an entirely different proof due to M. H. Escardó, which works on nuclei. The latter will make use of a fixed point theorem we have already seen on this site! Read the full post.

# Locales, sublocales II: sieves

Last time, I promised you we would explore another way of defining sublocales. We shall again use the naive approach that consists in imagining how we would encode subspaces of a T_{0} topological space *X* by looking at open subsets only, and certainly not at points. We shall encode a localic version of the notion of subspaces through what I call *sieves*, which are certain sets of *formal crescents*. I’ll then show you that this gives you a complete lattice that is isomorphic to the lattice of sublocales that we have seen last time. See the full post.