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-e98cb037f376fa53b314c166766ef55e@cmc.deusto.eus DTSTART:20230214T140000Z DTEND:20230214T151500Z DTSTAMP:20251031T223200Z CREATED:20251031 LAST-MODIFIED:20251031 PRIORITY:5 TRANSP:OPAQUE SUMMARY:Mini-workshop: Variational Methods, Functional Inequalities, and Shape Optimization DESCRIPTION:Next Tuesday, February 14, 2023:\nEvent: FAU DCN-AvH Mini-workshop: Variational Methods, Functional Inequalities, and Shape Optimization\nOrganized by: FAU DCN-AvH, Chair for Dynamics, Control and Numerics – Alexander von Humboldt Professorship at FAU, Friedrich-Alexander-Universität Erlangen-Nürnberg (Germany)\n15:00H\nTitle: Fractional Pohozaev Identities\nSpeaker: Dr. Sidy Moctar Djitte\nAffiliation: Postdoctoral researcher at FAU DCN-AvH\nAbstract. Pohozaev identities has become an essential tool in analysis of PDEs. Among other things, it guarantees uniqueness of solutions of supercritical semilinear Dirichlet problems. It is also an important tool in control theory of evolution equations. In this talk, we prove a generalised fractional Pohozaev identity and discuss its application. Specifically, we shall consider applications to nonexistence of solutions in the case of supercritical semilinear Dirichlet problems and regarding a Hadamard formula for the derivative of Dirichlet eigenvalues of the fractional Laplacian with respect to domain deformations. We also applied the identity to give an alternative proof of some classical improved Hardy type inequalities. We end the talk by stating some open problems and future research directions. \nThe talk will be based on the following works\n• A generalised Pohozaev identity and applications (S. M. D, M. M. Fall, and Tobias Weth), to appear in Advances in Calc of Var.\n• Fractional Hardy-Rellich inequalities via a Pohozaev identity (S.M. Djitte, and Nicola De Nitti), submitted.\n15:35H\nTitle: Rigidity Results for the Robin p-Laplacian\nSpeaker: Alba Lia Masiello\nAffiliation: Visiting PhD Student from University of Naples Federico II\nAbstract.Let Omegasubsetmathbb{R}^n, ngeq 2, be a bounded, open and Lipschitz set and let f be a positive function. We consider the following problem\n\nbegin{cases}\n-Delta_p u:= -div(vert{nabla u}^{p-2} nabla u)=f & text{ in } Omega \[1ex]\nvert{nabla u}^{p-2} displaystyle{frac{partial u}{partial nu}} + beta vert{u}^{p-2}u =0 & text{ on } partial Omega,\nend{cases}\nquad , ;(1)\n\nwhere nu is the unit exterior normal to partialOmega and beta>0, and its symmetrized version\n\nbegin{cases}\n-Delta_p v=f^sharp & text{ in } Omega^sharp \[1ex]\nvert{nabla v}^{p-2} displaystyle{frac{partial v}{partial nu}} + beta vert{v}^{p-2}v =0 & text{ on } partial Omega^sharp,\nend{cases}\nquad , ;(2)\n\nwhere Omega^sharp is the ball centered at the origin with the same measure of Omega.\nIn [1,2] the authors prove a comparison á la Talenti between the solutions to equations (1) and (2).\nIn particular, they prove\n\n parallel{u}_{L^{pk,p}(Omega)} , leq parallel{v}_{L^{pk,p}(Omega^sharp)}, quad , ; forall , 0 lt k leq frac{n(p-1)}{(n-2)p +n},\nquad , ;(3)\n\nand in the case fequiv 1, they prove\n\n parallel{u}_{L^{pk,p}(Omega)} , leq parallel{v}_{L^{pk,p}(Omega^sharp)}, quad , ; forall , 0 lt k leq frac{n(p-1)}{(n-2)p +n}, quad forall p>1,\nquad , ;(4)\n\nwhere parallel{cdot}parallel_{k,q} is the Lorentz norm of a measurable function.\nIn this seminar, we are interested in characterizing the equality cases in (3) and (4), proving that these estimates are rigid, i.e. the equality case can occur only in the symmetric setting.\nThis is a joint work with Gloria Paoli.\nReferences\n[1] A. Alvino, C. Nitsch, and C. Trombetti. A Talenti comparison result for solutions to elliptic problems with Robin boundary conditions. to appear on Comm. Pure Appl. Math.\n[2] V. Amato, A. Gentile, and A. L. Masiello. Comparison results for solutions to p-Laplace equations with Robin boundary conditions. Ann. Mat. Pura Appl. (4), 201(3):1189–1212, 2022.\nWHERE?\nOn-site / Online\nOn-site:\nRoom Übung 4 | 01.253-128. 1st. floor\nFriedrich-Alexander-Universität Erlangen-Nürnberg\nCauerstraße 11, 91058 Erlangen\nGPS-Koord. Raum: 49.573639N, 11.030503E\nOnline:\nZoom meeting link\nMeeting ID: 614 4658 159 | PIN code: 914397\nThis event on LinkedIn\n URL:https://cmc.deusto.eus/events-calendar/mini-workshop-variational-methods-functional-inequalities-and-shape-optimization/ ORGANIZER;CN=FAU DCN-AvH:MAILTO: CATEGORIES:FAU DCN Mini-Workshop,FAU-DCN Workshop LOCATION:DDS, Friedrich-Alexander-Universität Erlangen-Nürnberg ATTACH;FMTTYPE=image/png:https://cmc.deusto.eus/wp-content/uploads/FAUDCNAvH-JrSeminar-14feb2023-sDjitte-aMasiello.png END:VEVENT END:VCALENDAR