p-Adic TGD: Mathematical Ideas
Abstract
The mathematical basis of p-adic Higgs mechanism discussed in papers [email protected] 9410058-62 is considered in this paper. The basic properties of p-adic numbers, of their algebraic extensions and the so called canonical identification between positive real numbers and p-adic numbers are described. Canonical identification induces p-adic topology and differentiable structure on real axis and allows definition of definite integral with physically desired properties. p-Adic numbers together with canonical identification provide analytic tool to produce fractals. Canonical identification makes it possible to generalize probability concept, Hilbert space concept, Riemannian metric and Lie groups to p-adic context. Conformal invariance generalizes to arbitrary dimensions since p-adic numbers allow algebraic extensions of arbitrary dimension. The central theme of all developments is the existence of square root, which forces unique algebraic extension with dimension and for and respectively. This in turn implies that the dimensions of p-adic Riemann spaces are multiples of in case and of in case.
Keywords
Cite
@article{arxiv.hep-th/9506097,
title = {p-Adic TGD: Mathematical Ideas},
author = {M. Pitkänen},
journal= {arXiv preprint arXiv:hep-th/9506097},
year = {2008}
}
Comments
46 pages,latex, 6 .eps files representing p-adic fractals are supplied by request