BEGIN:VCALENDAR VERSION:2.0 PRODID:-//132.216.98.100//NONSGML kigkonsult.se iCalcreator 2.20.4// BEGIN:VEVENT UID:20250514T084703EDT-9634btFxsm@132.216.98.100 DTSTAMP:20250514T124703Z DESCRIPTION:Title: Perfect kernel of generalized Baumslag-Solitar groups\n \nAbstract: Endowed with the Chabauty topology\, the space of subgroups Su b(G) of any infinite countable group G is a closed subset of the Cantor sp ace\, on which G acts by conjugation. The perfect kernel of G is the large st closed subset of Sub(G) without isolated points. It is invariant by con jugation.\n In this talk\, we will see how the action of a group G on an or iented tree T can give information on the perfect kernel of G\, and on the dynamics induced by the action by conjugation on it. In 2023\, Azuelos an d Gaboriau studied the case where the stabilizers 'vanish'\, i.e. there ex ists an edge path of T whose stabilizer is finite. They proved that the cl osure of the G-invariant subset Sub|•\T|∞(G)\, which consists in the set o f subgroups of G acting on T with infinitely many orbits of edges\, is inc luded in the perfect kernel and contains a dense orbit.\n Generalizing resu lts obtained by Carderi\, Gaboriau\, Le Maître and Stalder\, we will study the space of subgroups of generalized Baumslag-Solitar groups\, i.e. grou ps acting cocompactly on an oriented tree with infinite cyclic edge and ve rtex stabilizers. These are typical examples of non vanishing stabilizers. \n After proving that the perfect kernel of such non amenable group exactly consists in Sub|•\T|∞(G)\, we show that this leads to very different dyna mics on it. In particular\, we show the existence of an infinite countable G-invariant partition of the perfect kernel such that:\n - one piece of th e decomposition is closed\, and all the other ones are open (and closed if f G is virtually the direct product of a free group with ℤ)\;\n - there exi sts a dense orbit in each of these pieces.\n DTSTART:20250217T150000Z DTEND:20250217T160000Z LOCATION:Room 1120\, Burnside Hall\, CA\, QC\, Montreal\, H3A 0B9\, 805 rue Sherbrooke Ouest SUMMARY:Sasha Bontemps (ENS de Lyon) URL:/mathstat/channels/event/sasha-bontemps-ens-de-lyo n-363698 END:VEVENT END:VCALENDAR