On the removal of the trace mode in lattice N=4 super Yang-Mills theory

Abstract

Twisted and orbifold formulations of lattice N=4 super Yang-Mills theory which possess an exact supersymmetry require a U(N)=SU(N) U(1) gauge group. In the naive continuum limit, the U(1) modes trivially decouple and play no role in the theory. However, at non-zero lattice spacing they couple to the SU(N) modes and can drive instabilities in the lattice theory. For example, it is well known that the lattice U(1) theory undergoes a phase transition at strong coupling to a chirally broken phase. An improved action that suppresses the fluctuations in the U(1) sector was proposed in arXiv:1505.03135 . Here, we explore a more aggressive approach to the problem by adding a term to the action which can entirely suppress the U(1) mode. The penalty is that the new term breaks the Q-exact lattice supersymmetry. However, we argue that the term is 1/N2 suppressed and the existence of a supersymmetric fixed point in the planar limit ensures that any SUSY-violating terms induced in the action possess couplings that also vanish in this limit. We present numerical results on supersymmetric Ward identities consistent with this conclusion.