Litcius/Paper detail

EFT asymptotics: the growth of operator degeneracy

Tom Melia, Sridip Pal

2021SciPost Physics22 citationsDOIOpen Access PDF

Abstract

We establish formulae for the asymptotic growth (with respect to the scaling dimension) of the number of operators in effective field theory, or equivalently the number of S-matrix elements, in arbitrary spacetime dimensions and with generic field content. This we achieve by generalising a theorem due to Meinardus and applying it to Hilbert series---partition functions for the degeneracy of (subsets of) operators. Although our formulae are asymptotic, numerical experiments reveal remarkable agreement with exact results at very low orders in the EFT expansion, including for complicated phenomenological theories such as the standard model EFT. Our methods also reveal phase transition-like behaviour in Hilbert series. We discuss prospects for tightening the bounds and providing rigorous errors to the growth of operator degeneracy, and of extending the analytic study and utility of Hilbert series to EFT.

Topics & Concepts

Degeneracy (biology)Hilbert spaceMathematicsOperator (biology)ScalingSeries (stratigraphy)Field (mathematics)Rigged Hilbert spacePure mathematicsHilbert–Poincaré seriesAnalytic functionTheoretical physicsOperator theoryAdvanced Operator Algebra ResearchSpectral Theory in Mathematical PhysicsBlack Holes and Theoretical Physics