Time: 9h00, Wednesday, November 27, 2019,
Location: Room 611-612, Building A6, Institute of Mathematics
Abstract: The purpose of this talk is twofold. The first one is to give second main theorems for meromorphic mappings from a parabolic manifold into $P^n(C)$  intersecting moving hypersurfaces with truncated counting functions, for possibly degenerate holomorphic maps and with good (meaning low) truncation level. The second purpose is to apply these second main theorems to prove uniqueness theorems for such  mappings sharing few moving hypersurfaces without counting multiplicities. Since the meromorphic maps may be degenerate, these results include the formally more general corresponding results for meromorphic maps from parabolic manifolds into projective algebraic varieties.

This talk is on joint work with Si Duc Quang (Hanoi National University of Education)