Get Free Shipping on orders over $0
Lattices and Codes : A Course Partially Based on Lectures by F. Hirzebruch - Wolfgang Ebeling

Lattices and Codes

A Course Partially Based on Lectures by F. Hirzebruch

By: Wolfgang Ebeling

eText | 6 December 2012 | Edition Number 2

At a Glance

eText


$129.00

or 4 interest-free payments of $32.25 with

 or 

Instant online reading in your Booktopia eTextbook Library *

Why choose an eTextbook?

Instant Access *

Purchase and read your book immediately

Read Aloud

Listen and follow along as Bookshelf reads to you

Study Tools

Built-in study tools like highlights and more

* eTextbooks are not downloadable to your eReader or an app and can be accessed via web browsers only. You must be connected to the internet and have no technical issues with your device or browser that could prevent the eTextbook from operating.
The purpose of coding theory is the design of efficient systems for the transmission of information. The mathematical treatment leads to certain finite structures: the error-correcting codes. Surprisingly problems which are interesting for the design of codes turn out to be closely related to problems studied partly earlier and independently in pure mathematics. This book is about an example of such a connection: the relation between codes and lattices. Lattices are studied in number theory and in the geometry of numbers. Many problems about codes have their counterpart in problems about lattices and sphere packings. We give a detailed introduction to these relations including recent results of G. van der Geer and F. Hirzebruch. Let us explain the history of this book. In [LPS82] J. S. Leon, V. Pless, and N. J. A. Sloane considered the Lee weight enumerators of self-dual codes over the prime field of characteristic 5. They wrote in the introduction to their paper: "The weight enumerator of anyone of the codes . . . is strongly constrained: it must be invariant under a three-dimensional representation of the icosahedral group. These invariants were already known to Felix Klein, and the consequences for coding theory were discovered by Gleason and Pierce (and independently by the third author) . . . (It is worth mentioning that precisely the same invariants have recently been studied by Hirzebruch in connection with cusps of the Hilbert modular surface associated with Q( J5).
on
Desktop
Tablet
Mobile

More in Algebra

Elementary Algebra : Collins College Outlines - Joan Van Glabek

eBOOK

Learn Calculus with Python - Nick McIntyre

eBOOK

RRP $61.72

$49.38

20%
OFF
Coclass graphs of p-groups - Heiko Dietrich

eTEXT

Excursions in Ring Theory - T. Y. Lam

eTEXT