BEGIN:VCALENDAR VERSION:2.0 PRODID:-//132.216.98.100//NONSGML kigkonsult.se iCalcreator 2.20.4// BEGIN:VEVENT UID:20260710T053130EDT-5699Lpv1C0@132.216.98.100 DTSTAMP:20260710T093130Z DESCRIPTION:How amenable are amenable operator algebras?\n\nAmenability is a property both of von Neumann algebras and of C*-algebras\, with an appro priate definition in each case. A discrete group is amenable in the classi cal sense if\, and only if\, all the C*-algebras and von Neumann algebras generated by it are amenable. (For a more general locally compact group th e situation is a bit more subtle.) There are many equivalent definitions o f amenability for both C*-algebras and von Neumann algebras. In addition\, a C*-algebra is amenable if\, and only if\, all the von Neumann algebras generated by it (in representations) are amenable. Every amenable von Neum ann algebra is generated by some amenable C*-algebra. Amazingly\, even tho ugh the classification of either amenable von Neumann algebras or amenable C*-algebras might\, on the face of it\, even with appropriate countabilit y assumptions\, threaten to be just as complicated as that of amenable gro ups---which is surely hopeless---even in the abelian case!---\, in fact\, amenable von Neumann algebras are completely classified by a simple invari ant\, and recently (but with a long history) there is an analogous result for amenable C*-algebras---with a certain additional well-behavedness prop erty that is quite simple to state. Most (or at least many!) naturally occ urring C*-algebras or von Neumann algebras are amenable\, just as is true for groups. There are also many\, many examples of amenable C*-algebras wh ich are well enough behaved to fit into the recent classification. Indeed\ , the class in question is just just those simple (separable\, amenable) C *-algebras that absorb tensorially a certain one of them\, which in a stro ng sense is just a souped-up version of the complex numbers. (There is an additional technical assumption\, which however may hold automatically.) S ince this funny algebra of complex numbers absorbs itself\, the tensor pro duct of an arbitrary simple separable amenable C*-algebra with it also abs orbs it---and is therefore in the classifiable class.\n DTSTART:20181108T193000Z DTEND:20181108T203000Z LOCATION:Room VCH-2810\, CA\, Université Laval SUMMARY:George A. Elliott\, University of Toronto URL:/mathstat/channels/event/george-elliott-university -toronto-291306 END:VEVENT END:VCALENDAR