Scaling dimensions in QED3 from the ε-expansion

Abstract

We study the fixed point that controls the IR dynamics of QED in d = 4 - 2ε. We derive the scaling dimensions of four-fermion and bilinear operators beyond leading order in ε-expansion. For the four-fermion operators, this requires the computation of a two-loop mixing that was not known before. We then extrapolate these scaling dimensions to d = 3 to estimate their value at the IR fixed point of QED3 as function of the number of fermions Nf. The next-to-leading order result for the four-fermion operators corrects significantly the leading one. Our best estimate at this order indicates that they do not cross marginality for any value of Nf, which would imply that they cannot trigger a departure from the conformal phase. For the scaling dimensions of bilinear operators, we observe better convergence as we increase the order. In particular, ε-expansion provides a convincing estimate for the dimension of the flavor-singlet scalar in the full range of Nf.