Wednesday, April 9, 2025

2025-04-15 / 16:30 ~ 17:30

IBS-KAIST 세미나 - 이산수학: A Minor Characterisation of Normally Spanned Sets of Vertices

by Nicola Lorenz(University of Hamburg)

A rooted spanning tree of a graph $G$ is called normal if the endvertices of all edges of $G$ are comparable in the tree order. It is well known that every finite connected graph has a normal spanning tree (also known as depth-first search tree). Also, all countable graphs have normal spanning trees, but uncountable complete graphs for example do not. In 2021, Pitz proved the following characterisation for graphs with normal spanning trees, which had been conjectured by Halin: A connected graph $G$ has a normal spanning tree if and only if every minor of $G$ has countable colouring number, i.e. there is a well-order of the vertices such that every vertex is preceded by only finitely many of its neighbours. More generally, a not necessarily spanning tree in $G$ is called normal if for every path $P$ in $G$ with both endvertices in $T$ but no inner vertices in $T$, the endvertices of $P$ are comparable in the tree order. We establish a local version of Pitz’s theorem by characterising for which sets $U$ of vertices of $G$ there is a normal tree in $G$ covering $U$. The results are joint work with Max Pitz.

2025-04-16 / 16:00 ~ 18:00

학과 세미나/콜로퀴엄 - 위상수학 세미나:

by ()

The Lipshitz-Ozsvath-Thurston correspondence is a combinatorial way to describe the bordered Floer homology of a knot complement from the UV=0 coefficient knot Floer homology of the given knot. This is then used to compute the knot Floer homology of satellite knots. In this talk, we show that there is a "relative" version of this correspondence, between homotopy classes of type D morphisms of bordered Floer homology and locally symmetric chain maps of knot Floer complexes, modulo the "canonical negative class". This gives us a fully combinatorial process to compute knot Floer cobordism maps of satellite concordances in the UV=0 knot Floer homology.

2025-04-14 / 16:00 ~ 17:00

편미분방정식 통합연구실 세미나 - 편미분방정식: Stability of shock profiles for the Navier-Stokes-Poisson system

by 심완용()

Abstract: In this talk, we consider the Navier-Stokes-Poisson (NSP) system which describes the dynamics of positive ions in a collision-dominated plasma. The NSP system admits a one-parameter family of smooth traveling waves, known as shock profiles. I will present my research on the stability of the shock profiles. Our analysis is based on the pointwise semigroup method, a spectral approach. We first establish spectral stability. Based on this, we obtain pointwise bounds on the Green's function for the associated linearized problem, which yield linear and nonlinear asymptotic orbital stability.

2025-04-11 / 14:00 ~ 16:00

IBS-KAIST 세미나 - 수리생물학: [Journal Club] Entrainment and multi-stability of the p53 oscillator in human cells

by 정의민(IBS 의생명수학그룹)

In this talk, we discuss the paper, “Entrainment and multi-stability of the p53 oscillator in human cells” by Alba Jiménez et al., Cell Systems, 2024.

2025-04-09 / 16:30 ~ 17:30

학과 세미나/콜로퀴엄 - 미분기하 세미나:

by 서검교(숙명여자대학교)

Serrin’s overdetermined problem is a famous result in mathematics that deals with the uniqueness and symmetry of solutions to certain boundary value problems. It is called "overdetermined" because it has more boundary conditions than usually required to determine a solution, which leads to strong restrictions on the shape of the domain. In this talk, we discuss overdetermined boundary value problems in a Riemannian manifold and discuss a Serrin-type symmetry result to the solution to an overdetermined Steklov eigenvalue problem on a domain in a Riemannian manifold with nonnegative Ricci curvature and it will be discussed about an overdetermined problems with a nonconstant Neumann boundary condition in a warped product manifold.

Events for the 취소된 행사 포함