BEGIN:VCALENDAR VERSION:2.0 PRODID:-// - ECPv5.3.1//NONSGML v1.0//EN CALSCALE:GREGORIAN METHOD:PUBLISH X-ORIGINAL-URL:https://aarms.math.ca X-WR-CALDESC:Events for BEGIN:VTIMEZONE TZID:America/Halifax BEGIN:DAYLIGHT TZOFFSETFROM:-0400 TZOFFSETTO:-0300 TZNAME:ADT DTSTART:20200308T060000 END:DAYLIGHT BEGIN:STANDARD TZOFFSETFROM:-0300 TZOFFSETTO:-0400 TZNAME:AST DTSTART:20201101T050000 END:STANDARD END:VTIMEZONE BEGIN:VEVENT DTSTART;TZID=America/Halifax:20201106T160000 DTEND;TZID=America/Halifax:20201106T170000 DTSTAMP:20260609T060529 CREATED:20200904T115630Z LAST-MODIFIED:20201108T225930Z UID:5470-1604678400-1604682000@aarms.math.ca SUMMARY:Dalhousie-AARMS AAMP Seminar: Reem Yassawi (Open University\, London) DESCRIPTION:Title: Some tame or wild Cantor dynamical systems\n Abstract: A topological dynamical system is a pair where is a compact metric spaces and is a group or semigroup acting continuously on . One algebraic invariant of a such a dynamical system is the Ellis semigroup.  The Ellis semigroup of a topological dynamical system is defined to be the compactification of the action in the topology of pointwise convergence on the space of all function .  Tameness is a concept whose roots date back to Rosenthal’s embedding theorem\, which says that if a sequence in does not have a weakly Cauchy subsequence\, then it must be a sequence on unit vectors in .  Köhler linked the concept of tameness to the Ellis semigroup.  A system is tame if its Ellis semigroup has size at most the continuum.  Non-tame systems are very far from tame\, as they must contain a copy of \, the Stone-Cech compactification of . \nIn this talk\, I will briefly survey the properties of the Ellis semigroup that make it an interesting object to study\, and discuss recent developments concerning tameness.  I will then discuss Toeplitz shifts\, which themselves have been studied extensively in this context and is the subject of some joint work with G. Fuhrmann and J. Kellendonk. \nThe Dalhousie-AARMS Analysis-Applied Math-Physics Seminar takes place on Fridays from 4 – 5 pm Atlantic Time over Zoom.  If you would like to attend\, please email the organizers for connection details. URL:https://aarms.math.ca/event/dalhousie-aarms-aamp-seminar-2020-10-16-2-2-2-2/ LOCATION:Zoom seminar CATEGORIES:AAMP Seminar ORGANIZER;CN="Suresh%20Eswarathasan":MAILTO:sr766936@dal.ca END:VEVENT END:VCALENDAR