BEGIN:VCALENDAR VERSION:2.0 PRODID:researchseminars.org CALSCALE:GREGORIAN X-WR-CALNAME:researchseminars.org BEGIN:VEVENT SUMMARY:Alexei Gazca Orozco DTSTART:20250219T080000Z DTEND:20250219T090000Z DTSTAMP:20260422T122258Z UID:MathMAC/26 DESCRIPTION:Title: A priori and a posteriori estimates for vectorial problems via convex dua lity\nby Alexei Gazca Orozco as part of Modelling of materials - theor y\, model reduction and efficient numerical methods (UNCE MathMAC)\n\n\nAb stract\nBy exploiting remarkable properties of the Crouzeix-Raviart and Ra viart-Thomas finite elements\, numerous works in recent years have been ab le to employ convex duality theory to derive error estimates for a diverse set of problems\, including total variation minimisation\, the p-Laplacia n\, the obstacle problem\, elastoplastic torsion\, among others. However\, virtually all of the available results have been developed for scalar pro blems with homogeneous Dirichlet boundary conditions. This work extends th e existing results in three directions\, taking the incompressible Stokes and linear elasticity systems as prototypical examples: it considers vecto rial as opposed to just scalar problems\, it includes non-homogeneous mixe d boundary conditions\, as well as loads in the dual of the energy space.\ n LOCATION:https://researchseminars.org/talk/MathMAC/26/ END:VEVENT END:VCALENDAR