A Renyi Quantum Null Energy Condition: Proof for Free Field Theories

Abstract

The Quantum Null Energy Condition (QNEC) is a lower bound on the stress-energy tensor in quantum field theory that has been proved quite generally. It can equivalently be phrased as a positivity condition on the second null shape derivative of the relative entropy Srel(||σ) of an arbitrary state with respect to the vacuum σ. The relative entropy has a natural one-parameter family generalization, the Sandwiched Renyi divergence Sn(||σ), which also measures the distinguishability of two states for arbitrary n∈[1/2,∞). A Renyi QNEC, a positivity condition on the second null shape derivative of Sn(||σ), was conjectured in previous work. In this work, we study the Renyi QNEC for free and superrenormalizable field theories in spacetime dimension d>2 using the technique of null quantization. In the above setting, we prove the Renyi QNEC in the case n>1 for arbitrary states. We also provide counterexamples to the Renyi QNEC for n<1.