English

Unifying renormalization group and the continuous wavelet transform

General Physics 2016-06-01 v2 High Energy Physics - Theory

Abstract

It is shown that the renormalization group turns to be a symmetry group in a theory initially formulated in a space of scale-dependent functions, i.e, those depending on both the position xx and the resolution aa. Such theory, earlier described in {\em Phys.Rev.D} 81(2010)125003, 88(2013)025015, is finite by construction. The space of scale-dependent functions {ϕa(x)}\{ \phi_a(x) \} is more relevant to physical reality than the space of square-integrable functions L2(Rd)\mathrm{L}^2(R^d), because, due to the Heisenberg uncertainty principle, what is really measured in any experiment is always defined in a region rather than point. The effective action Γ(A)\Gamma_{(A)} of our theory turns to be complementary to the exact renormalization group effective action. The role of the regulator is played by the basic wavelet -- an "aperture function" of a measuring device used to produce the snapshot of a field ϕ\phi at the point xx with the resolution aa. The standard RG results for ϕ4\phi^4 model are reproduced.

Keywords

Cite

@article{arxiv.1604.03431,
  title  = {Unifying renormalization group and the continuous wavelet transform},
  author = {M. V. Altaisky},
  journal= {arXiv preprint arXiv:1604.03431},
  year   = {2016}
}

Comments

LaTeX, 5 pages, 1 eps figure

R2 v1 2026-06-22T13:30:30.842Z