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A Map from Scalar Field Theory to Integer Polynomial Solutions

General Physics 2007-05-23 v1

Abstract

The terms in the quantum scattering in scalar field theory models is parameterized by the invariants sijnij\prod s_{ij}^{n_{ij}}. The sijs_{ij} are kinematic two-particle invariants, and the nijn_{ij} are integers. The coefficients of these terms are computed via integrating all Feynman diagrams, or within the derivative expansion by solving the iteration equations. The latter has been provided recently; the functions which are prefactors of the individual terms sijnij\prod s_{ij}^{n_{ij}} can be interpreted as terms in the expansions of L-series, which may be specified by collections of their zeroes. Once finding the appropriate elliptic curve coefficients, these quantum field solutions provide an algorithm to determining all of the mod p zeros to the algebraic curves. The latter is presumably determined by 'experimental' computer modeling or by the appropriate determination of the quantum prefactors.

Keywords

Cite

@article{arxiv.physics/0506013,
  title  = {A Map from Scalar Field Theory to Integer Polynomial Solutions},
  author = {Gordon Chalmers},
  journal= {arXiv preprint arXiv:physics/0506013},
  year   = {2007}
}

Comments

5 pages, LaTeX