BEGIN:VCALENDAR VERSION:2.0 PRODID:researchseminars.org CALSCALE:GREGORIAN X-WR-CALNAME:researchseminars.org BEGIN:VEVENT SUMMARY:Daniele Angella (Università di Firenze) DTSTART:20220525T160000Z DTEND:20220525T170000Z DTSTAMP:20260418T165642Z UID:GTACoS/4 DESCRIPTION:Title: T he Chern-Ricci Flow on Inoue-Bombieri surfaces\nby Daniele Angella (Un iversità di Firenze) as part of Geometry & TACoS - Session VIII : Complex Geometric Flows\n\n\nAbstract\nIn the tentative to move from the Kähler to the non-Kähler setting\, one can formulate several problems concerning Hermitian metrics on complex manifolds with special curvature properties. Among these problems\, we mention the existence of Hermitian metrics with constant scalar curvature with respect to the Chern connection\, and the generalizations of the Kähler-Einstein condition to the non-Kähler setti ng. They are usually translated and attacked as analytic pdes.\n\nIn this context\, the Chern-Ricci flow plays an useful role. The Chern-Ricci flow is a parabolic evolution equation for Hermitian metrics that extends the K ähler-Ricci flow to Hermitian manifolds. It is expected that the behavior of solutions of the Chern-Ricci flow deeply reflects the underlying compl ex structure. In particular\, understanding the behaviour of the Chern-Ric ci flow on non-Kähler compact complex surfaces is particularly interestin g\, due to the fact that minimal class VII surfaces are not yet completely classified.\n\nIn this talk\, we study the problem of uniform convergence of the normalized Chern-Ricci flow on Inoue-Bombieri surfaces with Gauduc hon metrics.\n\nThe talk is based on a joint work with Valentino Tosatti\, and on collaborations and discussions with Simone Calamai\, Francesco Ped iconi\, Cristiano Spotti.\n LOCATION:https://researchseminars.org/talk/GTACoS/4/ END:VEVENT END:VCALENDAR