neverendingbooks

Featured Series

Mumford’s treasure map

December 13, 20081

In the series “Brave new geometries” we give an introduction to ’strange’ but exciting new ideas. We start with Grothendieck’s scheme-revolution, go on with Soule’s geometry over the field with one element, Mazur’s arithmetic topology, Grothendieck’s anabelian geometry, Connes’ noncommutative geometry etc.

the Bost-Connes coset space

January 17, 20080

In the series “Noncommutative geometry and the Riemann zeta function” we give an introduction to the Bost-Connes algebra. We describe its relation to adeles/ideles and to KMS-states leading to the zeta-function as the partition function.

Conway’s puzzle M(13)

June 16, 20070

In the series “Mathieu games” we describe some mathematical games and puzzles connected to simple groups. We will encounter Conway’s M(13)-puzzle, the classic Loyd’s 15-puzzle and mathematical blackjack based on Mathieu’s sporadic simple group M(12).

best of 2008 (2) : big theorems

January 3, 20096

A comment to Charles Siegel's 'big theorems'-series got me checking my stats.

best of 2008 (1) : wiskundemeisjes

January 2, 20090

A feeble attempt to translate the Marcolli-post by the 'wiskundemeisjes'.

5 years blogging

December 31, 20085

A few recollections and a very quick number game by Hendrik Lenstra.

Mazur’s knotty dictionary

December 27, 20083

The algebraic fundamental group of a scheme gives the Mazur-Kapranov-Reznikov dictionary between primes in number fields and knots in 3-manifolds.

Manin’s geometric axis

December 23, 20080

Manin proposes the idea of projecting spec(Z[x]) not only onto spec(Z), but also to a geometric axis by considering the integers as an algebra over the field with one element.

Mumford’s treasure map

December 13, 20081

In the series "Brave new geometries" we give an introduction to 'strange' but exciting new ideas. We start with Grothendieck's scheme-revolution, go on with Soule's geometry over the field with