Abstract The fine grained energy spectrum of quantum chaotic systems is widely believed to be described by random matrix statistics. A basic scale in such a system is the energy range over which this behavior persists. We define the corresponding time scale by the time at which the linearly growing ramp region in the spectral form factor begins. We call this time t ramp. The purpose of this paper is to study this scale in many-body quantum systems that display strong chaos, sometimes called scrambling systems. We focus on randomly coupled qubit systems, both local and k-local (all-to-all interactions) and the Sachdev-Ye-Kitaev (SYK) model. Using numerical results, analytic estimates for random quantum circuits, and a heuristic analysis of H...
Abstract We use random matrix theory to explore late-time chaos in supersymmetric quantum mechanical...
In a fast scrambling many-body quantum system, information is spread and entanglement is built up on...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
We study the time evolution operator in a family of local quantum circuits with random �elds in a �x...
Phenomena in quantum chaotic systems such as spectral fluctuations are known to be described remark...
Abstract Chaos and complexity entail an entropic and computational obstruction to describing a syste...
Chaos in many-body quantum systems is of great importance to both many-body physics as well as black...
We study chaos and scrambling in unitary channels by considering their entanglement properties as st...
We propose and analyze a protocol to study quantum information scrambling using statistical correlat...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We study the scrambling of quantum information in local random unitary circuits by focusing on the t...
Recently, the question of a relevance of the so-called quantum chaos has been raised in applications...
Quantum chaotic interacting N-particle systems are assumed to show fast and irreversible spreading o...
Random transformations are typically good at “scrambling ” information. Specifically, in the quantum...
Quantum chaotic interacting N-particle systems are assumed to show fast and irreversible spreading o...
Abstract We use random matrix theory to explore late-time chaos in supersymmetric quantum mechanical...
In a fast scrambling many-body quantum system, information is spread and entanglement is built up on...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...
We study the time evolution operator in a family of local quantum circuits with random �elds in a �x...
Phenomena in quantum chaotic systems such as spectral fluctuations are known to be described remark...
Abstract Chaos and complexity entail an entropic and computational obstruction to describing a syste...
Chaos in many-body quantum systems is of great importance to both many-body physics as well as black...
We study chaos and scrambling in unitary channels by considering their entanglement properties as st...
We propose and analyze a protocol to study quantum information scrambling using statistical correlat...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
We study the scrambling of quantum information in local random unitary circuits by focusing on the t...
Recently, the question of a relevance of the so-called quantum chaos has been raised in applications...
Quantum chaotic interacting N-particle systems are assumed to show fast and irreversible spreading o...
Random transformations are typically good at “scrambling ” information. Specifically, in the quantum...
Quantum chaotic interacting N-particle systems are assumed to show fast and irreversible spreading o...
Abstract We use random matrix theory to explore late-time chaos in supersymmetric quantum mechanical...
In a fast scrambling many-body quantum system, information is spread and entanglement is built up on...
Abstract. The statistical properties of the spectrum of systems which have a chaotic classical limit...