Recent Comments
mathematicalsilence on The Ramanujan Challenge for… Gil Kalai on Polymath Plus AI Vijay Vazirani on Matching in NC and Local … Gil Kalai on Matching in NC and Local … Gil Kalai on Matching in NC and Local … rohitgurjar0 on Matching in NC and Local … Vijay Vazirani on Matching in NC and Local … Gil Kalai on Matching in NC and Local … Gil Kalai on Matching in NC and Local … Vijay Vazirani on Matching in NC and Local … Gil Kalai on Matching in NC and Local … Matching in NC and L… on Open problem session of HUJI-C… -
Recent Posts
- 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!
RSS
Monthly Archives: January 2012
Fractional Sylvester-Gallai
Avi Wigderson was in town and gave a beautiful talk about an extension of Sylvester-Gallai theorem. Here is a link to the paper: Rank bounds for design matrices with applications to combinatorial geometry and locally correctable codes by Boaz Barak, Zeev … Continue reading
Posted in Combinatorics, Computer Science and Optimization, Geometry
Tagged Avi Wigderson, Codes, Greg Kuperberg, Sylvester-Gallai
2 Comments
A Theorem About Infinite Cardinals Everybody Should Know
Cantor proved and we all know that for every cardinal we have This is a very basic fact about cardinal arithmetic and it is nice that the proof works for finite and infinite cardinals equally well. (For the finite case it … Continue reading
Posted in Mathematical logic and set theory
3 Comments