ModMax Oscillators and Root-T T-Like Flows in Supersymmetric Quantum Mechanics

Abstract

We construct a deformation of any (0+1)-dimensional theory of N bosons with SO(N) symmetry which is driven by a function of conserved quantities that resembles the root-T T operator of 2d quantum field theories. In the special case of N=2 bosons and a harmonic oscillator potential, the solution to the flow equation is the ModMax oscillator of arXiv:2209.06296. We argue that the deforming operator is related, in a particular special regime, to the dimensional reduction of the 2d root-T T operator on a spatial circle. It follows that the ModMax oscillator is a dimensional reduction of the 4d ModMax theory to quantum mechanics, justifying the name. We then show how to construct a manifestly supersymmetric extension of this root-T T-like operator for any (0+1)-dimensional theory with SO(N) symmetry and N=2 supersymmetry by defining a flow equation directly in superspace.