[QSMS Monthly Seminar] Closed orbits and Beatty sequences

by qsms posted Jun 24, 2021
?

단축키

Prev이전 문서

Next다음 문서

ESC닫기

크게 작게 위로 아래로 댓글로 가기 인쇄
Extra Form
일정시작 2021-06-25
일정종료 2021-06-25
배경색상 #036eb7

Date: 6월24일 금요일, 2021년

Place: 129동


Title: Closed orbits and Beatty sequences

Speaker: 강정수 교수

Abstract:

A long-standing open question in Hamiltonian dynamics asks whether every strictly convex hypersurface in R^{2n} carries at least n closed orbits. This was answered affirmatively in the non-degenerate case by Long and Zhu in 2002. The aim of this talk is to outline their proof and to highlight its connection to partitioning the set positive integers.


 

Title: On the $\tilde{H}$-cobordism group of $S^1 \times S^2$'s

Speaker: 이동수 박사

Abstract:

Kawauchi defined a group structure on the set of homology S1 × S2’s under an equivalence relation called $\tidle{H}$-cobordism. This group receives a homomorphism from the knot concordance group, given by the operation of zero-surgery. In this talk, we review knot concordance invariants derived from knot Floer complex, and apply them to show that the kernel of the zero-surgery homomorphism contains an infinite rank subgroup generated by topologically slice knots.

 

 

 

 


Articles

3 4 5 6 7 8 9