Tootfinder

Wonderful new art now on display in our Croll Family Entrance Hall. An exhibition titled “Tilt” by Julia Rooney ‘18 M.F.A. using cyanotypes to capture the light in Marquand Chapel. On display through May!

urban cyanotype
#cyanotype #photography #urban

David Loggan spent 12 years sketching & engraving the town & colleges of Cambridge before publishing his book of plates in 1690 as 'Cantabrigia Illustrata'. Background: https://www.museumofcambridge.org.uk/2025/10/david-loggans-views-of-ca…

David Loggan’s views of Cambridge: An extraordinary visual testimony of 17th century Cambridge
By Dr N. Henry The Museum of Cambridge has on display, on the first floor, an antique print of David Loggan’s views of Cambridge from the east and the west. This print was once part of Cantabrigia …

🇺🇦 #NowPlaying on #KEXP's #MorningShow
Andrew Gold feat. Cynthia Fee:
🎵 Thank You for Being a Friend
#AndrewGold #CynthiaFee
https://open.spotify.com/track/5yNUgA66PbcPIJPOU2eBwR
🎶 show playlist 👇
https://open.spotify.com/playlist/1r22YroTqfHn6X0RvVg67f
🎶 KEXP playlist 👇
https://open.spotify.com/playlist/6VNALrOa3gWbk794YuIrwg

I wanted to grab a big, strange mix of things for the last Bandcamp Friday of 2025, so I did. Here's what I got:
EP by Ishimura (the Dwelling Below/Cave guy)
https://centipedeabyss.bandcamp.com/album/beyond-the-horizon-realized
2 singles by Ra…

CNTV: ¿Quién estš confundido?
Columna da Paula Escobar.
https://wallabag.altgr.xyz/share/692c5630d5e3d6.59499680
Original 🔗

Shein, Temu... Existe-t-il un droit Š la mode ? Débat entre Féris BARKAT et Magali BERDAH - YouTube
#droit

Totally paracompact spaces and the Menger covering property
Davide Giacopello, Maddalena Bonanzinga, Piotr Szewczak
https://arxiv.org/abs/2511.10252 https://arxiv.org/pdf/2511.10252 https://arxiv.org/html/2511.10252
arXiv:2511.10252v1 Announce Type: new
Abstract: A topological space is totally paracompact if any base of this space contains a locally finite subcover. We focus on a problem of Curtis whether in the class of regular Lindel\"of spaces total paracompactness is equivalent to the Menger covering property. To this end we consider topological spaces with certain dense subsets. It follows from our results that the above equivalence holds in the class of Lindel\"of GO-spaces defined on subsets of reals. We also provide a game-theoretical proof that any regular Menger space is totally paracompact and show that in the class of first-countable spaces the Menger game and a partial open neighborhood assignment game of Aurichi are equivalent. We also show that if $\mathfrak{b}=\omega_1$, then there is an uncountable subspace of the Sorgenfrey line whose all finite powers are Lindel\"of, which is a strengthening of a famous result due to Michael.
toXiv_bot_toot

Entretanto, foi anunciada com pompa e circunstância a construção do hospital central do #algarve
Alguém estš a contabilizar as vezes que isto jš foi anunciado? Eu perdi-lhe a conta, confesso.
E se se fazem concursos para médicos e enfermeiros nos hospitais de Faro e Portimão e tendem a ficar desertos, como raio estão estes génios a pensar arranjar quem trabalhe no elefante branco cen…

🇺🇦 #NowPlaying on KEXP's #StreetSounds
Count Bass D:
🎵 Barista
#CountBassD
https://countbassd.bandcamp.com/track/barista
https://open.spotify.com/track/0ssdGFQDEJBk6eoNly5uyl