The tree of primes in a field

The product formula of algebraic number theory connects finite and infinite primes in a stringent way, a fact, while not hard to be checked, that has never ceased to be tantalizing. We propose a new concept of prime for any field and investigate some of its properties. There are algebraic primes, corresponding to valuations, such that every prime contains a largest algebraic one. For a number field, this algebraic part is zero just for the infinite primes. It is shown that the primes of any field form a tree with a kind of self-similar structure, and there is a binary operation on the primes, unexplored even for the rationals. Every prime defines a topology on the field, and each compact prime gives rise to a unique Haar measure, playing an essential part in the product formula.

Bibliographic Details

Main Author:	Rump,Wolfgang
Format:	Digital revista
Language:	English
Published:	Universidad de La Frontera. Departamento de Matemática y Estadística. 2010
Online Access:	http://www.scielo.cl/scielo.php?script=sci_arttext&pid=S0719-06462010000200007
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