3月25日
研討會, 演講, 講座
Department of Mathematics - Seminar on Statistics - Bayesian Pyramids: Identifiable Multilayer Discrete Latent Structure Models for Discrete Data
High dimensional categorical data are routinely collected in biomedical and social sciences. It is of great importance to build interpretable parsimonious models that perform dimension reduction and uncover meaningful latent structures from such discrete data.
3月19日
簡介會, 迎新
HKUST MSc in Data-Driven Modeling Virtual Information Session 2021 (English)
Join our Virtual Information Session on March 19, 2022 (Saturday) to meet our faculty, graduates and students! You will get to know more about: 
3月16日
研討會, 演講, 講座
Physics Department - Indefinite Causal Structures: How a Missing Arrow of Time Can be Useful to Increase Performances in Quantum Protocols
3月11日
研討會, 演講, 講座
Department of Mathematics - Seminar on PDE - A variational approach to describe the moduli space of minimal immersions in hyperbolic manifolds
In a seminal paper, Uhlenbeck studied the set of first and second fundamental form that arise from minimal immersions of a given surface into a three dimensional hyperbolic manifold.
3月11日
研討會, 演講, 講座
Department of Chemistry - PhD Student Seminar - Wearable Microfluidic Sweat Sensors for Healthcare Monitoring
Student: Miss Qiaoyi WANG Department: Department of Chemistry, HKUST Supervisor: Professor Hongkai WU
3月10日
研討會, 演講, 講座
Department of Mathematics - Seminar on Data Science and Applied Mathematics - Geometric Methods for Optimal Transportation
Optimal transport maps play fundamental roles in many engineering and medical fields. Due to the highly non-linear nature of the Monge-Amepre equation, the computation of optimal transport maps is very challenging.
3月7日
研討會, 演講, 講座
Department of Chemistry - PhD Student Seminar - Near-Infrared-II (NIR-II) Molecular Dyes for Biomedical Imaging
Student: Miss Jiaen LIANG Department: Department of Chemistry, HKUST Supervisor: Professor He YAN
3月4日
研討會, 演講, 講座
Department of Mathematics - Seminar on PDE - Rate of blow up in the thin obstacle problem
The thin obstacle problem is a classical free boundary problem arising from the study of an elastic membrane resting on a lower-dimensional obstacle. Concerning the behavior of the solution near a contact point between the membrane and the obstacle, many important questions remain open.
瀏覽理學院過往舉辦的活動。