Add to ORKGEntanglement entropy is a powerful tool in characterizing universal features in quantum many-body systems. In quantum chaotic Hermitian systems, typical eigenstates have near maximal entanglement with very small fluctuations. Here, we show that for Hamiltonians displaying non-Hermitian many-body quantum chaos, modeled by the Ginibre ensemble, the entanglement entropy of typical eigenstates is greatly suppressed. The entropy does not grow with the Hilbert space dimension for sufficiently large systems and the fluctuations are of equal order. We derive the novel entanglement spectrum that has infinite support in the complex plane and strong energy dependence. We provide evidence of universality and similar behavior is found in the non-Hermiti...
The relation between entanglement entropy and the computational difficulty of classically simulating...
In this work we study many-body 'steady states' that arise in the non-Hermitian generalisation of th...
The entanglement entropy of subsystems of typical eigenstates of quantum many-body Hamiltonians has ...
We analyze the subsystem size scaling of the entanglement entropy of a non-ergodic pure state that c...
We study unitary evolution of bipartite entanglement in a circuit with nearest-neighbor random gates...
In systems governed by “chaotic” local Hamiltonians, we conjecture the universality of eigenstate en...
In this paper, we study symmetry-resolved entanglement entropy in free bosonic quantum many-body sys...
Correlation functions and entanglement are two different aspects to characterize quantum many-body s...
We consider the statistical properties of eigenstates of the time-evolution operator in chaotic many...
Characterizing the entanglement of matrix degrees of freedom is essential for understanding the holo...
Quantum entanglement is one essential element to characterize many-body quantum systems. However, th...
We explore the relation between entanglement entropy of quantum many-body systems and the distributi...
We consider a quantum oscillator coupled to a bath of $N$ other oscillators. The total system evolve...
It is a fundamental problem how the universal concept of classical chaos emerges from the microscopi...
Spectral rigidity in Hermitian quantum chaotic systems signals the presence of dynamical universal f...
The relation between entanglement entropy and the computational difficulty of classically simulating...
In this work we study many-body 'steady states' that arise in the non-Hermitian generalisation of th...
The entanglement entropy of subsystems of typical eigenstates of quantum many-body Hamiltonians has ...
We analyze the subsystem size scaling of the entanglement entropy of a non-ergodic pure state that c...
We study unitary evolution of bipartite entanglement in a circuit with nearest-neighbor random gates...
In systems governed by “chaotic” local Hamiltonians, we conjecture the universality of eigenstate en...
In this paper, we study symmetry-resolved entanglement entropy in free bosonic quantum many-body sys...
Correlation functions and entanglement are two different aspects to characterize quantum many-body s...
We consider the statistical properties of eigenstates of the time-evolution operator in chaotic many...
Characterizing the entanglement of matrix degrees of freedom is essential for understanding the holo...
Quantum entanglement is one essential element to characterize many-body quantum systems. However, th...
We explore the relation between entanglement entropy of quantum many-body systems and the distributi...
We consider a quantum oscillator coupled to a bath of $N$ other oscillators. The total system evolve...
It is a fundamental problem how the universal concept of classical chaos emerges from the microscopi...
Spectral rigidity in Hermitian quantum chaotic systems signals the presence of dynamical universal f...
The relation between entanglement entropy and the computational difficulty of classically simulating...
In this work we study many-body 'steady states' that arise in the non-Hermitian generalisation of th...
The entanglement entropy of subsystems of typical eigenstates of quantum many-body Hamiltonians has ...