| Lecturer | 김동한 |
|---|---|
| Dept. | 동국대학교 |
| date | Nov 08, 2018 |
The Lagrange spectrum is the set of approximation constants in the Diophantine approximation for badly approximated numbers. It is closely related with the Markov spectrum which corresponds the minimum values of indefinite quadratic forms over integral vectors. We discuss the Diophantine approximation for the rational points in the unit circle. We will introduce a dynamical system originally defined by Romik in 2008, study its Lagrange and Markov spectra.
Fixed points of symplectic/Hamiltonian circle actions
A modified separation method to solve a heat-transfer boundary value problem
Arithmetic of elliptic curves
<학부생을 위한 ɛ 강연> Convergence of Fourier series and integrals in Lebesgue spaces
Trends to equilibrium in collisional rarefied gas theory
The Lagrange and Markov Spectra of Pythagorean triples
A-infinity functor and topological field theory
Weak and strong well-posedness of critical and supercritical SDEs with singular coefficients
Algebraic surfaces with minimal topological invariants
A wrapped Fukaya category of knot complement and hyperbolic knot
Alice and Bob meet Banach and von Neumann
Congruences between modular forms
W-algebras and related topics
On function field and smooth specialization of a hypersurface in the projective space
<학부생을 위한 ɛ 강연> 기하와 대수의 거울대칭
1 is big enough to understand 3
Mathemaics & Hedge Fund
Unique ergodicity for foliations
Conformal field theory in mathematics
<학부생을 위한 ɛ 강연> A mathematical approach to xEV battery system
