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- The Ramanujan Challenge for AI
- Matching in NC and Local Events
- A sensational Ramsey breakthrough by Domagoj Bradač (reblogged from Sam Mattheus’ blog)
- Three Interviews
- Amazing: Erdős’ Unit Distance Problem was Disproved! It was achieved by AI!
- Polymath Plus AI
- Starting Today: Kazhdan Sunday seminar: “Boolean Functions, Hypercontractivity, and Applications”
- Scott Aaronson’s View of my View About Quantum Computing
- The Fully Depolarizing Noise Conjecture for Physical Cat States is Twenty Years Old!
Top Posts & Pages
- The Ramanujan Challenge for AI
- יופיה של המתמטיקה
- The Polynomial Hirsch Conjecture: Discussion Thread
- Polymath 3: Polynomial Hirsch Conjecture
- A Few Slides and a Few Comments From My MIT Lecture on Quantum Computers
- Polymath10: The Erdos Rado Delta System Conjecture
- Polymath 3: The Polynomial Hirsch Conjecture 2
- Elchanan Mossel's Amazing Dice Paradox (your answers to TYI 30)
- Why Quantum Computers Cannot Work: The Movie!
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Monthly Archives: March 2017
My Answer to TYI- 28
The fifteen remarkable individuals in the previous post are all the recipients of the SIGACT Distinguished Service Prize since it was established in 1997. The most striking common feature to all of them is, in my view, that they are all … Continue reading
Posted in Computer Science and Optimization, Women in science
Tagged SIGACT, Women in science
2 Comments
Test your intuition 28: What is the most striking common feature to all these remarkable individuals
Test your intuition: What is the most striking common feature to all these fifteen remarkable individuals László Babai; Avi Wigderson; Lance Fortnow; Lane Hemaspaandra; Sampath Kannan; Hal Gabow; Richard Karp; Tom Leighton; Rockford J. Ross; Alan Selman; Michael Langston; S. … Continue reading
R(5,5) ≤ 48
The Ramsey numbers R(s,t) The Ramsey number R(s, t) is defined to be the smallest n such that every graph of order n contains either a clique of s vertices or an independent set of t vertices. Understanding the values … Continue reading
Posted in Combinatorics, Open problems, Updates
Tagged Brendan D. McKay, Vigleik Angeltveit
1 Comment
Test Your Intuition (27) about the Alon-Tarsi Conjecture
On the occasion of Polymath 12 devoted to the Rota basis conjecture let me remind you about the Alon-Tarsi conjecture and test your intuition concerning a strong form of the conjecture. The sign of a Latin square is the product … Continue reading
Posted in Combinatorics, Open problems, Test your intuition
Tagged Alon-Tarsi conjecture, Polymath12
3 Comments