Department Seminars and Colloquium
Jungin Lee (아주대학교)Number Theory Seminar
Random p-adic matrices with given zero entries
Jae Choon Cha (POSTECH)Colloquium
“Topological = Smooth” in Dimension 4
박노성 (카이스트 전산학부)ACM Seminars
Differential Equation-inspired Deep Learning for Node Classification and Spatiotemporal Forecasting
Jaehong Kim (KAIST)Etc.
Introduction to complex algebraic geometry and Hodge theory #2
Sungyoon Cho (POSTECH)Number Theory Seminar
On the Kudla-Rapoport conjecture at a place of bad reduction
Graduate Seminars
SAARC Seminars
PDE Seminars
IBS-KAIST Seminars
Conferences and Workshops
Student News
Bookmarks
Research Highlights
Bulletin Boards
Problem of the week
Suppose that we roll \(n\) (6-sided, fair) dice. Let \(S_n\) be the sum of their faces. Find all positive integers \(k\) such that the probability that \(k\) divides \(S_n\) is \(1/k\) for all \(n \geq 1\).
KAIST Compass Biannual Research Webzine
Suppose that we roll \(n\) (6-sided, fair) dice. Let \(S_n\) be the sum of their faces. Find all positive integers \(k\) such that the probability that \(k\) divides \(S_n\) is \(1/k\) for all \(n \geq 1\).