Shaw College Lam Kin Chung Department Scholarships The Chinese University of Hong Kong Faculty of Science Dean’s honors List Young Chemist Award, Department of Chemistry, National University of SingaporeĪsian Core Program Lectureship Award (Hong Kong)Ĭhemistry Research Promotion Center/NSC Lectureship (Taiwan)Īsian Core Program Lectureship Award (Korea, China)Īsian Core Program Lectureship Award (Thailand)Īsian Core Program Lectureship Award (Japan) Young Investigator Award, Faculty of Science, National University of Singapore MIT Technology Review Innovator Under 35 (Asia) Outstanding Fellow, Faculty of Science, CUHKĪsian Rising Star Lectureship, Asian Chemical Congress 2019Īsian Core Program Lectureship Award (Japan, Taiwan) Novel functional molecules synthesis for biological studiesĬroucher Senior Research Fellowship, Croucher Foundation The main focuses are centered on novel methodologies development and complex molecules synthesis. Research Interests Our research group has broad interests in synthetic organic chemistry. Openings: We are recruiting PhD and Postdoc candidates, please email your applications to me directly if you are interested. Postdoctoral Fellow, Department of Chemistry, Harvard University Professor, Department of Chemistry, The Chinese University of Hong KongĬhairman, Department of Chemistry, The Chinese University of Hong KongĪssociate Professor, Department of Chemistry, The Chinese University of Hong KongĪssistant Head, Department of Chemistry, National University of SingaporeĪssociate Professor, Department of Chemistry, National University of SingaporeĪssistant Professor, Department of Chemistry, National University of Singapore Visits to this page since August 12, 2017.B.Sc. Topological structures of moduli spaces of curves and anabelian geometry in positive characteristic (with Z. See the talk slides 2021.6.30RIMSĪnd 2021.7.9RIMS (or the introduction of the paper) In particular, the main conjecture of our theory (= the Homeomorphism Conjecture) supplies a viewpoint to see what properties of fundamental groups should be anabelian. The moduli spaces of fundamental groups give a general formulation for describing anabelian phenomena of curves over algebraically closed fields of positive characteristics which were discovered by Prof. Moduli spaces of fundamental groups of curves in positive characteristic I,, arXiv. Topological and group-theoretical specializations of fundamental groups of curves in positive characteristic. On the averages of p-rank of generic curves in positive characteristic. In particular, we obtain a new proof of Mochizuki's famous theorem concerning (Isom-version) Grothendieck's anabelian conjecture for curves over sub-p-adic fields without using p-adic Hodge theory. In the present paper, we establish a method to treat artithmetic fundamental groups of curves over both mixed characteristic and positive characteristic local fields. On the arithmetic fundamental groups of curves over local fields (with Y. In particular, our construction shows that the anabelian phenomena for curves over algebraically closed fields of positive characteristic can be understood by using not only entire tame fundamental groups but also certain finite quotients of them. In the present paper, we give an explicit construction of differences of tame fundamental groups of certain non-isomorphic curves via finite quotients. On finite quotients of tame fundamental groups of curves in positive characteristic. Generalized Hasse-Witt invariants for coverings with prescribed ramifications. ĭegeneration of period matrices of stable curves. On the existence of non-finite coverings of stable curves over complete discrete valuation rings. On the ordinariness of coverings of stable curves. On the existence, geometry and p-ranks of vertical fibers of coverings of curves. On the admissible fundamental groups of curves over algebraically closed fields of characteristic p>0. Group-theoretic characterizations of almost open immersions of curves. The anabelian geometry of curves over algebraically closed fields of positive characteristic. On the averages of generalized Hasse-Witt invariants of pointed stable curves in positive characteristic. On the existence of specialization isomorphisms of admissible fundamental groups in positive characteristic. Raynaud-Tamagawa theta divisors and new-ordinariness of ramified coverings of curves. View-only version of Springer Nature Content Sharing Initiative Maximum generalized Hasse-Witt invariants and their applications to anabelian geometry. On topological and combinatorial structures of pointed stable curves over algebraically closed fields of positive characteristic. P-groups, p-rank, and semi-stable reduction of coverings of curves. Research Institute for Mathematical Sciences, Kyoto University
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