| Lecturer | 최인송 |
|---|---|
| Dept. | 건국대학교 |
| date | Oct 06, 2011 |
The spaces admitting a rational parameterization are called rational. In particular plane conics, including circles, are rational. We will explain a few interesting applications of the rational parameterization of a circle. Also several examples and properties of the rational/non-rational varieries will be discussed.
젊은과학자상 수상기념강연: From particle to kinetic and hydrodynamic descriptions to flocking and synchronization
원의 유리매개화에 관련된 수학
돈은 어떻게 우리 삶에 돈며들었는가? (불확실성 시대에 부는 선형적으로 증가하는가?)
극소곡면의 등주부등식
곡선의 정의란 무엇인가?
Zeros of the derivatives of the Riemann zeta function
Zeros of linear combinations of zeta functions
What is Weak KAM Theory?
What is model theory?
What happens inside a black hole?
WGAN with an Infinitely wide generator has no spurious stationary points
Weyl character formula and Kac-Wakimoto conjecture
Weak and strong well-posedness of critical and supercritical SDEs with singular coefficients
W-algebras and related topics
Volume entropy of hyperbolic buildings
Vlasov-Maxwell equations and the Dynamics of Plasmas
Variational Methods without Nondegeneracy
Unprojection
Universality of log-correlated fields
Unique ergodicity for foliations
