Thursday, November 18, 2021

2021-11-24 / 17:00 ~ 19:00

학과 세미나/콜로퀴엄 - 해외 석학 특별 강연 시리즈:

by ()

Geometric and functional inequalities play a crucial role in several problems arising in analysis and geometry. Proving the validity of such inequalities, and understanding the structure of minimizers, is a classical and important question. In these lectures I will first give an overview of this beautiful topic and discuss some recent results.

2021-11-23 / 16:30 ~ 17:30

IBS-KAIST 세미나 - 이산수학: Ramsey numbers of Boolean lattices

by Casey Tompkins(IBS 이산수학그룹)

The poset Ramsey number $R(Q_{m},Q_{n})$ is the smallest integer $N$ such that any blue-red coloring of the elements of the Boolean lattice $Q_{N}$ has a blue induced copy of~$Q_{m}$ or a red induced copy of $Q_{n}$. Axenovich and Walzer showed that $n+2\le R(Q_{2},Q_{n})\le2n+2$. Recently, Lu and Thompson improved the upper bound to $\frac{5}{3}n+2$. In this paper, we solve this problem asymptotically by showing that $R(Q_{2},Q_{n})=n+O(n/\log n)$. Joint work with Dániel Grósz and Abhishek Methuku.

2021-11-19 / 13:00 ~ 14:00

학과 세미나/콜로퀴엄 - PDE 세미나:

by ()

This series of lectures will focus on recent developments of the so-called a-contraction theory and its application to the study of discontinuous flow at high Reynolds numbers. We will first introduce the classical framework to study the stability of 1D shocks for compressible flows. Recent multi-D applications will be presented next, both in the context of compressible and incompressible flows.

2021-11-24 / 16:15 ~ 17:15

학과 세미나/콜로퀴엄 - 정수론: On the Brumer-Stark conjecture

by Prof Mahesh Kakde(Indian Institute of Science)

The talk with start with an introduction to Stark’s conjectures. We will then specialise to the situation of Brumer-Stark conjecture and its various refinements. I will then sketch a proof of the conjecture. This is a joint work with Samit Dasgupta.

2021-11-18 / 12:25 ~ 12:45

대학원생 세미나 - 대학원생 세미나: Chern classes of tautological sheaves on Hilbert schemes of points on surface

by 최도영(KAIST)

I will introduce some concepts of Chern classes, Hilbert schemes and tautological sheaves on Hilbert scheme of points which is associated to a line bundle on surfaces. Also, I will provide a brief description of Lehn's work which gives an algorithmic approach of the action of the Chern classes of tautological bundles on the cohomology of Hilbert schemes of points on a smooth surface. His work is based on the framework of Nakajima's oscillator algebra. At the end, I will present the computation of the top Segre classes of tautological bundles associated to line bundles on $Hilb^n$ up to $n \leq 7$, extending computations of Severi, LeBarz, Tikhomirov and Troshina.

2021-11-25 / 12:25 ~ 12:45

대학원생 세미나 - 대학원생 세미나: Eigenvalues and parity factors in graphs

by 김동규(KAIST & IBS)

Let $G$ be a graph and let $g, f$ be nonnegative integer-valued functions defined on $V(G)$ such that $g(v) \le f(v)$ and $g(v) \equiv f(v) \pmod{2}$ for all $v \in V(G)$. A $(g,f)$-parity factor of $G$ is a spanning subgraph $H$ such that for each vertex $v \in V(G)$, $g(v) \le d_H(v) \le f(v)$ and $f(v)\equiv d_H(v) \pmod{2}$. In this paper, we prove sharp upper bounds for certain eigenvalues in an $h$-edge-connected graph $G$ with given minimum degree to guarantee the existence of a $(g,f)$-parity factor; we provide graphs showing that the bounds are optimal. This is a joint work with Suil O.

2021-11-18 / 12:00 ~ 12:20

대학원생 세미나 - 대학원생 세미나: What is the correct diffusion equation in heterogeneous mediums

by 김호연(KAIST)

In the classical diffusion theory, the diffusivity has been regarded as an intrinsic property of particles. However, it can't explain diffusion phenomena in heterogeneous medium, one of the most famous example is Soret effect. The diffusivity can be changed along different mediums and it arises a question: how can we express heterogeneous diffusion. In this talk, I'll introduce the heterogeneous diffusion equation we found and give some experimental data verifying this work.

2021-11-25 / 12:00 ~ 12:20

대학원생 세미나 - 대학원생 세미나: A new elementary proof of the central limit theorem

by 진우영(KAIST)

The proof of the central limit theorem (CLT) is often deferred to a graduate course in probability because the notion of characteristic functions is sometimes considered too advanced. I’ll start the talk by reviewing the past efforts to provide an elementary proof of the CLT which is not based on characteristic functions. Then I will explain a new proof of the CLT that derives it from the de Moivre-Laplace theorem, which is the CLT for Bernoulli random variables. The de Moivre-Laplace theorem is the first instance of the CLT in the history, and can be proved directly by computation.

2021-11-22 / 16:30 ~ 18:00

학과 세미나/콜로퀴엄 - 계산수학 세미나: Multigrid Methods for Vector Field Problems

by 오덕순(충남대학교)

We design and analyze V‐cycle multigrid methods for problems posed in H(div) and H(curl). Due to the fact that traditional smoothers do not work well for the vector field problems, special approaches for smoothers in the multigrid methods are essential. We introduce new smoothing techniques which involve non-overlapping domain decomposition preconditioners based on substructuring. We prove uniform convergence of the V‐cycle methods on bounded convex hexahedral domains. Numerical experiments that support the theory are also presented.

2021-11-19 / 10:00 ~ 11:00

SAARC 세미나 - SAARC 세미나:

by 김판기(서울대학교, 수리과학과)

In this talk, we first review some basics on stochastic processes. Then we discuss about the recent developments on Brownian-like jump processes. This talk is based on joint projects with Ante Mimica, Joohak Bae, Jaehoon Kang, Jaehun Lee.

2021-11-25 / 18:00 ~ 19:00

IBS-KAIST 세미나 - 수리생물학:

by ()

Simple mathematical models have had remarkable successes in biology, framing how we understand a host of mechanisms and processes. However, with the advent of a host of new experimental technologies, the last ten years has seen an explosion in the amount and types of quantitative data now being generated. This sets a new challenge for the field – to develop, calibrate and analyse new models to interpret these data. In this talk I will use examples relating to intracellular transport and cell motility to showcase how quantitative comparisons between models and data can help tease apart subtle details of biological mechanisms.

2021-11-18 / 11:00 ~ 12:00

IBS-KAIST 세미나 - 수리생물학:

by ()

TBA

2021-11-19 / 16:00 ~ 17:00

학과 세미나/콜로퀴엄 - PDE 세미나:

by 지정민()

Singular perturbations occur when a small coefficient affects the highest order derivatives in a system of partial differential equations. From the physical point of view, singular perturbations generate thin layers near the boundary of a domain, called boundary layers, where many important physical phenomena occur. In fluid mechanics, the Navier-Stokes equations, which describe the behavior of viscous flows, appear as a singular perturbation of the Euler equations for inviscid flows, where the small perturbation parameter is the viscosity. In general, verifying the convergence of the Navier-Stokes solutions to the Euler solution (known as the vanishing viscosity limit problem) remains an outstanding open question in mathematical physics. Up to now, it is not known if this vanishing viscosity limit holds true or not, even in 2D for which the existence, uniqueness, and regularity of solutions for all time are known for both the Navier-Stokes and Euler. In this talk, we discuss a recent result on the boundary layer analysis for the Navier-Stokes equations under a certain symmetry where the complete structure of boundary layers, vanishing viscosity limit, and vorticity accumulation on the boundary are investigated by using the method of correctors. We also discuss how to implement effective numerical schemes for slightly viscous fluid equations where the boundary layer correctors play essential roles. This is a joint work in part with J. Kelliher, M. Lopes Filho, A. Mazzucato, and H. Nussenzveig Lopes, and with C.-Y. Jung and H. Lee.

2021-11-25 / 16:15 ~ 17:15

학과 세미나/콜로퀴엄 - 콜로퀴엄: Mathematical modeling for infectious disease using epidemiological data

by 이효정(경북대학교 통계학과)

The new infectious disease are emerging around the world. Coronavirus disease 2019 (COVID-19) caused by a novel coronavirus has emerged and has been rapidly spreading. The World Health Organization (WHO) declared the COVID-19 outbreak a global pandemic on March 11, 2020. Mathematical modelling plays a key role in interpreting the epidemiological data on the outbreak of infectious disease. Moreover, mathematical modeling can give us an early warning about the size of the outbreak. First, we construct a mathematical model to estimate the effective reproduction numbers, which assess the effect of control interventions. Second, we forecast the COVID-19 cases according to the different effect of control interventions. Finally, the most effective intervention can be suggested in terms of modeling approach. In this talk, I’d like to briefly introduce the main results of recent research on the mathematical modeling for various infectious diseases.

2021-11-18 / 16:00 ~ 17:00

학과 세미나/콜로퀴엄 - 콜로퀴엄: The Monster and the universe

by 김현규(이화여자대학교)

I will give an introduction to the Monstrous moonshine conjectures of 70's-80's, which are on remarkable relations between Klein's j-invariant in number theory and the Monster sporadic simple group. I will only assume mild basic knowledge of complex analysis and group theory. I will start from a brief introduction to modular forms and Hauptmoduln, then connect it to finite simple groups. If I can manage the time, I will briefly explain a hint to a connection to the 3d gravity theory. https://kaist.zoom.us/j/84619675508

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