BEGIN:VCALENDAR VERSION:2.0 PRODID:-//132.216.98.100//NONSGML kigkonsult.se iCalcreator 2.20.4// BEGIN:VEVENT UID:20260709T083024EDT-9094uncWWx@132.216.98.100 DTSTAMP:20260709T123024Z DESCRIPTION:Some (possibly weakly) closed categories part 2\n\nI am interes ted in the so-called 'weak' higher dimensional categories (HDC's) as unive rses in which to do category theory\, and intuitionistic set theory as a p art of category theory. The adjective 'weak' refers to a type-dependent re placement of (Fregean\, logical) equality by a 'coherence' structure. On t he lowest level\, this means replacing equality of sets\, and more general ly\, equality of objects in a category\, by isomorphisms -- following Bour baki and Lawvere. The totally-weak HDC's\, for instance tricategories\, an d more generally the Batanin-type n-categories\, are ideal from a conceptu al point of view\, but very difficult to work with\, or in. Therefore a co herence theorem\, such as the one that establishes that a certain 'semi-st rict' (or 'semi-weak') concept called 'Gray category' is 'equivalent' to ' tricategory' is a welcome excuse to concentrate on the semi-strict concept . To motivate the technical work on Gray categories\, I will show how 'wea k' versions of the usual categorical concepts of pullback and discrete fib ration give intuitively convincing access to set-theoretic concepts such a s the power-set\, differently from topos theory. To begin the mathematics of Gray categories\, I will define\, for Gray categories X and A\, an inte rnal hom-object [X\,A]\, itself a Gray category\, and show that it is the basis for an -- at least 'weakly' -- closed structure in the sense of Eile nberg and Kelly.\n DTSTART:20181030T183000Z DTEND:20181030T193000Z LOCATION:Room 920\, Burnside Hall\, CA\, QC\, Montreal\, H3A 0B9\, 805 rue Sherbrooke Ouest SUMMARY:Michael Makkai\, ³ÉÈËVRÊÓÆµ URL:/mathstat/channels/event/michael-makkai-mcgill-291 214 END:VEVENT END:VCALENDAR