The Epsilon Expansion Meets Semiclassics

Abstract

We study the scaling dimension φn of the operator φn where φ is the fundamental complex field of the U(1) model at the Wilson-Fisher fixed point in d=4-. Even for a perturbatively small fixed point coupling λ*, standard perturbation theory breaks down for sufficiently large λ*n. Treating λ* n as fixed for small λ* we show that φn can be successfully computed through a semiclassical expansion around a non-trivial trajectory, resulting in φn=1λ*-1(λ* n)+0(λ* n)+λ* 1(λ* n)+… We explicitly compute the first two orders in the expansion, -1(λ* n) and 0(λ* n). The result, when expanded at small λ* n, perfectly agrees with all available diagrammatic computations. The asymptotic at large λ* n reproduces instead the systematic large charge expansion, recently derived in CFT. Comparison with Monte Carlo simulations in d=3 is compatible with the obvious limitations of taking =1, but encouraging.