Detecting quantum chaos via pseudo-entropy and negativity (2403.05875v1)

Abstract: Quantum informatic quantities such as entanglement entropy are useful in detecting quantum phase transitions. Recently, a new entanglement measure called pseudo-entropy was proposed which is a generalization of the more well-known entanglement entropy. It has many nice properties and is useful in the study of post-selection measurements. In this paper, one of our goals is to explore the properties of pseudo-entropy and study the effectiveness of it as a quantum chaos diagnostic, i.e. as a tool to distinguish between chaotic and integrable systems. Using various variants of the SYK model, we study the signal of quantum chaos captured in the pseudo-entropy and relate it to the spectral form factor (SFF) and local operator entanglement (LOE). We also explore another quantity called the negativity of entanglement which is a useful entanglement measure for a mixed state. We generalized it to accommodate the transition matrix and called it pseudo-negativity in analogy to pseudo-entropy. We found that it also nicely captures the spectral properties of a chaotic system and hence also plays a role as a tool of quantum chaos diagnostic.