Unitarity and Universality in non relativistic Conformal Field theory

Abstract

We relate the notion of unitarity of a SL(2,R) invariant field theory with that of a Schrodinger field theory using the fact that SL(2,R) is a subgroup of Schrodinger group. Exploiting SL(2,R) unitarity, we derive the unitarity bounds and null conditions for a Schr\"odinger field theory (for the neutral as well as the charged sector). In non integer dimensions the theory is shown to be non-unitary. Furthermore, the use of SL(2,R) subgroup opens up the possibility of borrowing results from 1D SL(2,R) invariant field theory to explore Schrodinger field theory, in particular, the sector with zero charge. We explore the consequences of SL(2,R) symmetry e.g. the convergence of operator product expansion in the kinematic limit, where all the operators (neutral and/or charged) are on same temporal slice (x=constant), the universal behavior of weighted spectral density function, existence of infinite number of SL(2,R) primaries, the analytic behavior of three point function as a function of spatial separation. We discuss the implication of imposing parity invariance (τ-τ) in addition to Schrodinger invariance and emphasize its difference from time reversal (τ -τ with charge conjugation).