BEGIN:VCALENDAR VERSION:2.0 METHOD:PUBLISH CALSCALE:GREGORIAN PRODID:-//WordPress - MECv6.5.6//EN X-ORIGINAL-URL:https://cmc.deusto.eus/ X-WR-CALNAME:cmc.deusto.eus X-WR-CALDESC:DeustoCCM - Chair of Computational Mathematics at University of Deusto REFRESH-INTERVAL;VALUE=DURATION:PT1H X-PUBLISHED-TTL:PT1H X-MS-OLK-FORCEINSPECTOROPEN:TRUE BEGIN:VEVENT CLASS:PUBLIC UID:MEC-9a405a7732ab4f806431a48f6398a7cb@cmc.deusto.eus DTSTART:20230419T140000Z DTEND:20230419T150000Z DTSTAMP:20251031T213100Z CREATED:20251031 LAST-MODIFIED:20251031 PRIORITY:5 TRANSP:OPAQUE SUMMARY:FAU MoD Lecture: From Alan Turing to contact geometry: Towards a “Fluid computer” DESCRIPTION:Date: Wed. April 19, 2023\nEvent: FAU MoD Lecture\nOrganized by: FAU MoD, Research Center for Mathematics of Data at Friedrich-Alexander-Universität Erlangen-Nürnberg (Germany)\nTitle: From Alan Turing to contact geometry: Towards a “Fluid computer”\nSpeaker: Prof. Dr. Eva Miranda\nAffiliation: UPC, Universitat Politècnica de Catalunya · BarcelonaTech\nAbstract. Is hydrodynamics capable of performing computations? (Moore, 1991). Can a mechanical system (including a fluid flow) simulate a universal Turing machine? (Tao, 2016). Etnyre and Ghrist unveiled a mirror between contact geometry and fluid dynamics reflecting Reeb vector fields as Beltrami vector fields. With the aid of this mirror, we can answer in the positive the questions raised by Moore and Tao. This is done by combining techniques from Alan Turing with modern Geometry (contact geometry) to construct a “Fluid computer” in dimension 3.\nThis construction shows, in particular, the existence of undecidable fluid paths. Tao’s question was motivated by a research program to address the Navier–Stokes existence and smoothness problem. Could such a Fluid computer be used to address this Millennium prize problem? We will end up the talk with some speculative ideas of a Fluid computer construction à la Feynman.\nWHERE?\nOn-site / Online\nRoom H13. Johann-Radon-Hörsaal\nDepartment Mathematik. Friedrich-Alexander-Universität Erlangen-Nürnberg\nCauerstraße 11, 91058 Erlangen\nGPS-Koord. Raum: 49.573764N, 11.030028E\nOnline:\nZoom meeting link\nMeeting ID: 614 4658 159 | PIN code: 914397\n \n\nPoster of the event\nThis event on LinkedIn\n \nCheck this at the official page of the event\nYou might like:\n• FAU MoD Lecture: Applications of AAA Rational Approximation by Prof. Dr. Nick Trefethen\n• FAU MoD Lecture: Learning-Based Optimization and PDE Control in User-Assignable Finite Time by Prof. Dr. Miroslav Krstic\n URL:https://cmc.deusto.eus/events-calendar/fau-mod-lecture-from-alan-turing-to-contact-geometry-towards-a-fluid-computer/ ORGANIZER;CN=FAU MoD:MAILTO: CATEGORIES:FAU MoD Lecture,Seminar/Talk LOCATION:Friedrich-Alexander-Universität Erlangen-Nürnberg ATTACH;FMTTYPE=image/png:https://cmc.deusto.eus/wp-content/uploads/FAUMoDLectureSeries_EvaMiranda_19apr2023.png END:VEVENT END:VCALENDAR