Critical scaling coefficients in second order PDE (CRITPDE)
HFRI - CRITPDE - 14952, PI: Georgios Sakellaris
Project CRITPDE aims to investigate the exact way in which a PDE is affected by considering critical lower order terms in a
variety of problems. To carry out this investigation, a variety of techniques from regularity theory for PDE and
Harmonic Analysis will be used, going beyond the state of the art in the respective fields.
Research Group
Seick Kim, Yonsei University
Bruno Poggi, Universitat Autònoma de Barcelona
Xavier Ros Oton, ICREA and Universitat de Barcelona
Sungjin Lee, Aristotle University of Thessaloniki
Publications / Preprints
- The Neumann Green function and scale invariant regularity estimates for elliptic equations
with Neumann data in Lipschitz domains. Joint with Seick Kim. Calculus of Variations and PDE 63 (2024), article no. 219. (doi link)
