Jeong-Seop Kim, Positivity of Tangent Bundles of Fano Threefolds

TBA

     Speaker Jeong-Seop Kim KAIST As well as the Hartshorne-Frankel conjecture on the ampleness of tangent bundle, it has been asked to characterize a smooth projective variety X whose tangent bundle TX attains certain positivity, e.g., nefness, k-ampleness, or bigness. But for the ampleness, the complete answers are not known even within the class

Guolei Zhong, Strictly Nef Divisors on Singular Varieties

TBA

     Speaker Guolei Zhong IBS CCG A Q-Cartier divisor on a normal projective variety is said to be strictly nef, if it has positive intersection with every integral curve. It has been a long history for people to measure how far a strictly nef divisor is from being ample. In this talk, I will

Yonghwa Cho, Nodal Sextics and Even Sets of Nodes

B234

     Speaker Yonghwa Cho IBS CCG It is a classical question to ask how many nodes may a surface contain. For sextics, the maximum number of nodes is 65, and is attained by Barth's example. We ask further: are all sextics with 65 nodes like Barth's example? To find an answer, we study even

Hoseob Seo, On L2 Extension from Singular Hypersurfaces

B234

     Speaker Hoseob Seo IBS CCG In L2 extension theorems from an irreducible singular hypersurface in a complex manifold, important roles are played by certain measures such as the Ohsawa measure, which determines when a given function can be extended. In this talk, we show that the singularity of the Ohsawa measure can be

Guolei Zhong, Dynamical Characterization of Projective Toric Varieties

B266 IBS, Korea, Republic of

     Speaker Guolei Zhong IBS-CCG As a fundamental building block of the equivariant minimal model program, the rationally connected variety plays a significant role in the classification of projective varieties admitting non-isomorphic endomorphisms. Twenty years ago, Nakayama confirmed Sato’s conjecture that, a smooth projective rational surface is toric if and only if it admits

Benjamin McMillan, The Range of the Killing Operator

B236-1 IBS, Korea, Republic of

     Speaker Benjamin McMillan IBS-CCG The Killing operator in (semi) Riemannian geometry has well understood kernel: the infinitesimal symmetries of a given metric. At the next level, the range of the Killing operator can be interpreted as those perturbations of the metric that result from a mere change of coordinates---in contexts like general relativity,

Jinhyun Park, A Reciprocity Theorem Arising from a Family of Algebraic Curves

B236-1 IBS, Korea, Republic of

     Speaker Jinhyun Park KAIST The classical reciprocity theorem, also called the residue theorem, states that the sum of the residues of a rational (meromorphic) differential form on a compact Riemann surface is zero. Its generalization to smooth projective curves over a field is often called the Tate reciprocity theorem. There is a different

Jaewoo Jeong, Hankel Index of Smooth Non-ACM Curves of Almost Minimal Degree

B236-1 IBS, Korea, Republic of

     Speaker Jaewoo Jeong IBS CCG   The Hankel index of a real variety is a semi-algebraic invariant that quantifies the (structural) difference between nonnegative quadrics and sums of squares on the variety. Note that the Hankel index of a variety is difficult to compute and was computed for just few cases. In 2017,

Dennis The, A Cartan-theoretic Perspective on (2,3,5)-distributions

B236-1 IBS, Korea, Republic of

     Speaker Dennis The UiT The Arctic University of Norway Generic rank 2 distributions on 5-manifolds, i.e. "(2,3,5)-distributions", are interesting geometric structures arising in the study of non-holonomic systems, underdetermined ODE of Monge type, conformal 5-manifolds with special holonomy, etc. The origins of their study date to Élie Cartan's "5-variables" paper of 1910, where

Laurent Stolovitch, Introduction to Normal Form Theory of Holomorphic Vector Fields 2

B236-1 IBS, Korea, Republic of

     Speaker Laurent Stolovitch Universite Cote d’Azur In this short lecture, I will introduce the notion of normal form and resonances. I will also explain the phenomenon of "small divisors" and give some fundamental results of holomorphic conjugacy to a normal form.

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