Michael Nielsen has collected a number of possible logos for the polymath wiki and is asking for discussion on them.

## April 28, 2011

## 1 Comment »

RSS feed for comments on this post. TrackBack URI

Filed under: planning — Terence Tao @ 4:37 pm

Michael Nielsen has collected a number of possible logos for the polymath wiki and is asking for discussion on them.

RSS feed for comments on this post. TrackBack URI

## Recent Comments

Terence Tao on Polymath7 research thread 5: t… Irwin Penkins on A new polymath proposal (relat… tchow8 on Rota’s Basis Conjecture:… dsp on Rota’s Basis Conjecture:… Waldo on Polymath 13 – a suc… tchow8 on Rota’s Basis Conjecture:… Sally Dong on Rota’s Basis Conjecture:… Anonymous on Polymath 13 – a suc… Where were we? | Com… on Rota’s Basis Conjecture:… tchow8 on Rota’s Basis Conjecture:… tchow8 on Rota’s Basis Conjecture:… domotorp on Rota’s Basis Conjecture:… tchow8 on Rota’s Basis Conjecture:… domotorp on Rota’s Basis Conjecture:… tchow8 on Rota’s Basis Conjecture:… ## Polymath Wiki – most recent changes

- Polymath15 test problem February 25, 2018 Teorth
- Effective bounds on H t - second approach February 24, 2018 Teorth
- Polymath15 test problem February 23, 2018 Teorth
- Polymath15 test problem February 23, 2018 Teorth
- De Bruijn-Newman constant February 23, 2018 Teorth
- Effective bounds on H t - second approach February 22, 2018 Teorth
- De Bruijn-Newman constant February 19, 2018 Teorth
- Effective bounds on H t - second approach February 18, 2018 Teorth

## Blogroll

## Projects

## Proposals

## Pages

## Categories

- discussion (6)
- finding primes (8)
- hot spots (7)
- Improving Roth bounds (1)
- mock-up (2)
- news (9)
- planning (7)
- polymath proposals (29)
- polymath5 (1)
- research (13)

## Top Posts

- A new polymath proposal (related to the Riemann Hypothesis) over Tao's blog
- Spontaneous Polymath 14 - A success!
- How to use LaTeX in comments
- Proposal: deterministic way to find primes
- Minipolymath2 project: IMO 2010 Q5
- Minipolymath4 project: IMO 2012 Q3
- Rota's Basis Conjecture: Polymath 12?
- Polymath5: Erdős’s discrepancy problem
- Polymath 13 - a success!
- Polymath Proposals on Math Overflow

%d bloggers like this:

All these logos have symmetry in them. Why not try some thing from the chaos/fractal structures like the spreading of ink!

This will reflect the ideas that we are trying to generate!!!

Comment by Sunil S Halapeti — May 10, 2011 @ 7:52 am |