+44 1865 615116
University of Oxford
Andrew Wiles Building
Radcliffe Observatory Quarter
Partial Differential Equations (PDEs), fluid dynamics, differential geometry.
Keble College, Parks Road, Oxford (OX1 3PG)
My DPhil thesis defense will be taken place in June 2017 (projected).
Starting from July 2017 I will move to the Rice University, Houston (USA) as a G. C. Evans Instructor. In 2017--2019 I will also be a CRM-ISM fellow at Centre de Recherches Mathématiques/Institut des Sciences Mathématiques, Montréal (Canada).
Prelims and Part A tutorials at Oriel College.
Prizes, Awards, and Scholarships:
Phi Beta Kappa (2013)
Keble Association Study Awards (2014, 2015, 2016)
Major / Recent Publications:
 G.-Q. Chen, S. Li, Global Weak Rigidity of the Gauss-Codazzi-Ricci Equations and Isometric Immersions of Riemannian Manifolds with Lower Regularity, Submitted to J. Geom. Anal., ArXiv Preprint: 1607.06862 (2016).
 A. Acharya, G. Chen, S. Li, M. Slemrod, D. Wang, Fluid, Elasticity, Geometry, and the Existence of Wrinkled Soluitons, To appear in Arch. Rat. Mech. Anal. (2017).
 G.-Q. Chen, S. Li, Compensated Compactness in Banach Spaces and Weak Rigidity of Isometric Immersions of Manifolds, To Appear in the Proceedings for Helge Holden’s Sixtieth Birthday, EMS, ArXiv preprint: 1610.01649 (2016).
 S. Li, On one-Dimensional Compressible Navier-Stokes Equations for a Reacting Mixture in Unbounded Domains, Submitted to Z. Angew. Math. Phys., ArXiv Preprint: 1610.07076 (2016).
 G. Q. Chen, S. Li, Generalized Quadratic Theorems in Compensated Compactness and Weak Rigidity of Isometric Immersions of Semi-Riemannian Submanifolds with Lower Regularity. To Be Submitted.
 G. Q. Chen, S. Li, and Z. Qian, Inviscid Limits from Navier-Stokes to Euler Equations under Kinematic and Navier Boundary Conditions. In preparation.