The Explicit Formula and a Propagator
Abstract
I give a new derivation of the Explicit Formula for the general number field K, which treats all primes in exactly the same way, whether they are discrete or archimedean, and also ramified or not. In another token, I advance a probabilistic interpretation of Weil's positivity criterion, as opposed to the usual geometrical analogies or goals. But in the end, I argue that the new formulation of the Explicit Formula signals a specific link with Quantum Fields, as opposed to the Hilbert-Polya operator idea (which leads rather to Quantum Mechanics).
Keywords
Cite
@article{arxiv.math/9809119,
title = {The Explicit Formula and a Propagator},
author = {Jean-Francois Burnol},
journal= {arXiv preprint arXiv:math/9809119},
year = {2007}
}
Comments
21 pages, plain TeX. The division into chapters is revised to more clearly separate the old from the new, and the main proof is better explained. The discrete spectrum is given more correctly (to account for q=2). Other notational and stylistic improvements