Counting Surfaces: CRM Aisenstadt Chair lectures (Progress in Mathematical Physics Book 70)

★★★★★ 4.7 28 reviews

US$40.20
Price when purchased online
Free shipping Free 30-day returns

Sold and shipped by tommy2000.com
We aim to show you accurate product information. Manufacturers, suppliers and others provide what you see here.
US$40.20
Price when purchased online
Free shipping Free 30-day returns

How do you want your item?
You get 30 days free! Choose a plan at checkout.
Shipping
Arrives Jul 16
Free
Pickup
Check nearby
Delivery
Not available

Sold and shipped by tommy2000.com
Free 30-day returns Details

Product details

Management number 233580226 Release Date 2026/06/27 List Price US$40.20 Model Number 233580226
Category

The problem of enumerating maps (a map is a set of polygonal "countries" on a world of a certain topology, not necessarily the plane or the sphere) is an important problem in mathematics and physics, and it has many applications ranging from statistical physics, geometry, particle physics, telecommunications, biology, ... etc. This problem has been studied by many communities of researchers, mostly combinatorists, probabilists, and physicists. Since 1978, physicists have invented a method called "matrix models" to address that problem, and many results have been obtained.Besides, another important problem in mathematics and physics (in particular string theory), is to count Riemann surfaces. Riemann surfaces of a given topology are parametrized by a finite number of real parameters (called moduli), and the moduli space is a finite dimensional compact manifold or orbifold of complicated topology. The number of Riemann surfaces is the volume of that moduli space. More generally, an important problem in algebraic geometry is to characterize the moduli spaces, by computing not only their volumes, but also other characteristic numbers called intersection numbers.Witten's conjecture (which was first proved by Kontsevich), was the assertion that Riemann surfaces can be obtained as limits of polygonal surfaces (maps), made of a very large number of very small polygons. In other words, the number of maps in a certain limit, should give the intersection numbers of moduli spaces.In this book, we show how that limit takes place. The goal of this book is to explain the "matrix model" method, to show the main results obtained with it, and to compare it with methods used in combinatorics (bijective proofs, Tutte's equations), or algebraic geometry (Mirzakhani's recursions).The book intends to be self-contained and accessible to graduate students, and provides comprehensive proofs, several examples, and gives the general formula for the enumeration of maps on surfaces of any topology. In the end, the link with more general topics such as algebraic geometry, string theory, is discussed, and in particular a proof of the Witten-Kontsevich conjecture is provided. Read more

ASIN B01DA01IF2
XRay Not Enabled
Format Print Replica
ISBN13 978-3764387976
Edition 1st ed. 2016
Language English
File size 8.1 MB
Page Flip Not Enabled
Publisher Birkhäuser
Word Wise Not Enabled
Print length 431 pages
Accessibility Learn more
Part of series Progress in Mathematical Physics
Publication date March 21, 2016
Enhanced typesetting Not Enabled

Correction of product information

If you notice any omissions or errors in the product information on this page, please use the correction request form below.

Correction Request Form

Customer ratings & reviews

4.7 out of 5
★★★★★
28 ratings | 11 reviews
How item rating is calculated
View all reviews
5 stars
86% (24)
4 stars
2% (1)
3 stars
1% (0)
2 stars
1% (0)
1 star
10% (3)
Sort by

There are currently no written reviews for this product.