Session Code

분과명 Title/Topic

주관교수 Organizers

Slot A 4/29(목) 12:50- 14:20

Slot B 4/29(목) 14:40- 16:10

Slot C 4/30(금) 09:00- 10:30

Slot D 4/30(금) 10:50- 12:20

Invited Lectures-Ⅰ 4/30(금) 13:30- 14:00

Invited Lectures-Ⅱ, III 4/30(금) 14:20- 15:20

AL

대수학
Algebra

김영훈
(서울대)

  O  

   O 

O

O

AN

해석학
Analysis

김세익
(연세대)

O

O

 O  

O

O

GE

기하학
Geometry

표준철
(부산대)

O

 O 

O

O

TO

위상수학
Topology

김태희
(건국대)

O

O

O

O

O

PS

확률·통계학
Probability and Statistics

김경훈
(고려대)

O

O 

O

AM

응용수학
(AI, Data Science 포함)
Applied Mathematics(including AI, Data Science)

이준엽
(이화여대)

   O

O

O

O

ME

수학교육
Mathematical Education

김영록
(한국외대)

O

O 

DM

이산수학
Discrete Mathematics

조수진
(아주대)

O

 O

O

CR

암호학
Cryptography

이주영
(카이스트)

O

O

O

Session Code

세션명 Title/Topic

주관교수 Organizers

Slot A 4/29(목) 12:50- 14:20

Slot B 4/29(목) 14:40- 16:10

Slot C 4/30(금) 09:00- 10:30

Slot D 4/30(금) 10:50- 12:20

FS-01

수학 전공자의 BIG(사업/산업체/정부기관) 경력 Careers for Mathematics Majors on BIG

강명주
(서울대)

O

Mathematics majors learn to think analytically, solve problems and justify solutions with qualitative reasoning and quantitative data.
Traditionally, Math majors usually thought that they want to be a professor. But with above mentioned Math skills, Math majors are in high demand in many areas such as BIG. In this session, the speakers will introduce and discuss about the career paths on BIG with their own hands-on experiences.

FS-02

플로어 이론과 응용 Floer Theory and Its Applications

조철현
(서울대)
박경배
(강원대)

O

O

O

About 100 years ago, Marston Morse introduced a theory of analyzing the topology of a manifold by studying differentiable functions on the manifold, now known as Morse theory. An infinite dimensional version of Morse theory was developed by Andras Floer in late 80’s and applied to his proof of the Arnold’s conjecture in symplectic geometry. Since then Floer theory has been one of the main tools in the study of symplectic geometry and low-dimensional topology. This focus session, which celebrates 100 years of Morse theory, will bring researchers from geometry and topology working on Floer theory and its applications to share their recent results and discuss the current and future developments.

Session Code

세션명 Title/Topic

주관교수 Organizers

Slot A 4/29(목) 12:50- 14:20

Slot B 4/29(목) 14:40- 16:10

Slot C 4/30(금) 09:00- 10:30

Slot D
4/30(금) 10:50- 12:20

SS-01

가환대수학 및 관련 분야 Commutative Algebra and Related Fields

김환구
(호서대)
천상민
(중앙대)

O

O

This special session will present various topics related to commutative algebra.

SS-02

대수적 정수론과 그 응용에 대한 연구 Research on Algebraic Number Theory and Its Applications

이준호
(목포대)

O

O

This special session focuses on various topics on algebraic number theory and its applications.
We will share recent results in several topics related to algebraic number theory and exchange research ideas among them.

SS-03

해석적 정수론과 관련 주제들 Analytic Number Theory and Related Topics

임수봉
(성균관대)

O

 O

Analytic number theory is a branch of number theory and plays an important role in modern number theory using various analytical methods. In this special session, we will discuss the latest results on topics related to analytic number theory.

SS-04

대수다양체 상의 벡터번들 Vector Bundles on Algebraic Varieties

최인송
(건국대)
허석문
(성균관대)

O

O

This special session brings together the researchers in algebraic geometry who are interested in recent advances on the theory of bundles and related topics.

SS-05

최적화 문제와 행렬 평균 Optimization Problem and Matrix Mean

김세정
(충북대)

O

Many optimization problems and solutions have been studied in the area of pure and applied mathematics.
Such problems including the least squares mean are appeared on the setting of positive definite Hermitian matrices, and connected to certain matrix equations. Through this session we have an opportunity to talk recent works, to develop the consequences and to collaborate.

SS-06

재생핵 힐베르트 공간 상의 작용소론 Operator Theory on Reproducing Kernel Hilbert Spaces

김인현
(인천대)
황인성
(성균관대)

O

O

The session will be devoted, but not limited to the following topics:
- operator theory on reproducing kernel Hilbert spaces;
- general theory of reproducing kernel Hilbert spaces;
- spectral theory of individual linear operators;
- algebras of operators

SS-07

물리학/집단 행동으로부터 파생되는 비선형 미분방정식 Nonlinear Differential Equations from Physics and Collective Behavior

고동남
(가톨릭대)
김도현
(성신여대)

    O

   O

Nonlinear differential equations have been extensively and intensively used for modeling of several phenomena in engineering, biological and physical systems, for instance, nonconvex stochastic optimization, swarming behavior and phase transition. For the modeling, nonlinear differential equations arise in different scales: microscopic, mesoscopic and macroscopic. Hence, several mathematical machineries are required to investigate such nonlinear differential equations such as dynamical system theory, variational technique, conservation law, etc. In this special session, we discuss the recent results on modeling, analysis and numerical analysis for nonlinear differential equations.

SS-08

타원형과 포물선형 편미분방정식의 최신 연구 경향 Recent Trends in Elliptic and Parabolic PDEs with Applications

박진해
(충남대)
이영애
(경북대)

   O

  O

O

The session will bring t experts and researchers in elliptic and parabolic partial differential equations to promote research and to stimulate interactions among the participants.

SS-09

리만 다양체와 로렌쯔 다양체의 기하학적 구조
Geometric Structures on Riemannian and Lorentzian manifolds

김병학
(경희대)
이상덕
(단국대)

O

O

This session focuses on the geometris structures of Riemannian and Lorentzian geometry. We also introduce the latest research results and discuss about them.

SS-10

인공지능 및 데이터과학 분야에서의 수학적 연구 Mathematical Topics in Artificial Intelligence and Data Science

임성빈
(울산과학
기술원)

O

O

Artificial Intelligence and Data Science are drawing massive attention from engineering and science and creating remarkable innovations in the various industry fields. Still, there remain challenging problems that are fundamental for advancing the safe, fair, interpretable, and explainable AI. This session will provide an introduction and mathematical approaches to important artificial intelligence and data science research topics.

SS-11

최적화 이론 및 머신러닝 Optimization and Machine Learning

류경석
(서울대)

 O

O

This special session explores recent advances in optimization theory and machine learning. Topics include convex optimization, non-convex optimization, large-scale parallel and distributed optimization, and their interaction with machine learning.

SS-12

응용대수 및 최적화 이론 Applied Algebra and Optimization

권순학
(성균관대)

O

O

The various fields of applied algebra are related to optimization theory, and in recent years they have been used in various applications such as big data, information theory, and the theory of computation. In addition, industrial mathematics, which has recently been in the limelight, is organically connected with the above mentioned research fields of mathematics, and it has also been originated from joint efforts to find solutions to many industrial problems. This special session is organized for a meeting place to explore the recent development in the fields of applied algebra, optimization theory and the theory of data analysis.

SS-13

극단적 조합론 및 확률론적 조합론 Extremal and Probabilistic Combinatorics

Tuan Tran
(IBS Discrete
Mathematics
Group)

O

O

Extremal combinatorics and probabilistic combinatorics are two of the most central branches of combinatorics.
In extremal combinatorics, one typically study the maximum or minimum possible size of a collection of finite objects under some restrictions.
Probabilistic combinatorics deals with probability distributions on discrete structures. In this special special session, we will discuss some of the latest developments in these fields.