Add to ORKGWe systematically study the short range spectral fluctuation properties of three non-hermitian spin chain hamiltonians using complex spacing ratios. In particular we focus on the non-hermitian version of the standard one-dimensional anisotropic XY model having intrinsic rotation-time-reversal ($\mathcal{RT}$) symmetry that has been explored analytically by Zhang and Song in [Phys.Rev.A {\bf 87}, 012114 (2013)]. The corresponding hermitian counterpart is also exactly solvable and has been widely employed as a toy model in several condensed matter physics problems. We show that the presence of a random field along the $x$-direction together with the one along $z$ facilitates integrability and $\mathcal{RT}$-symmetry breaking leading to the em...
The effect of disorder on the quantum phase transitions induced by a transverse field, anisotropy, a...
In this thesis we investigate the intersection of the three fields of random matrix theory, quantum ...
We present a random matrix theory for systems invariant under the joint action of parity, P, and tim...
We study the spectral properties of and spectral-crossovers between different random matrix ensemble...
Non-hermitian systems have gained a lot of interest in recent years. However, notions of chaos and l...
Symmetries associated with complex conjugation and Hermitian conjugation, such as time-reversal symm...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
The entanglement spectrum statistics (ESS) of a disordered and generalised time reversal invariant X...
The entanglement spectrum statistics (ESS) of a disordered and generalised time reversal invariant X...
The entanglement spectrum statistics (ESS) of a disordered and generalised time reversal invariant X...
Spectral rigidity in Hermitian quantum chaotic systems signals the presence of dynamical universal f...
Recent studies have revealed intriguing similarities between the contribution of wormholes to the gr...
We propose a measure, which we call the dissipative spectral form factor (DSFF), to characterize the...
We discuss spectral correlations in coarse-grained chaotic two-dimensional CFTs with large central c...
The aim of this work is to study the spectral statistics of the asymmetric rotor model (triaxial rig...
The effect of disorder on the quantum phase transitions induced by a transverse field, anisotropy, a...
In this thesis we investigate the intersection of the three fields of random matrix theory, quantum ...
We present a random matrix theory for systems invariant under the joint action of parity, P, and tim...
We study the spectral properties of and spectral-crossovers between different random matrix ensemble...
Non-hermitian systems have gained a lot of interest in recent years. However, notions of chaos and l...
Symmetries associated with complex conjugation and Hermitian conjugation, such as time-reversal symm...
A key goal of quantum chaos is to establish a relationship between widely observed universal spectra...
The entanglement spectrum statistics (ESS) of a disordered and generalised time reversal invariant X...
The entanglement spectrum statistics (ESS) of a disordered and generalised time reversal invariant X...
The entanglement spectrum statistics (ESS) of a disordered and generalised time reversal invariant X...
Spectral rigidity in Hermitian quantum chaotic systems signals the presence of dynamical universal f...
Recent studies have revealed intriguing similarities between the contribution of wormholes to the gr...
We propose a measure, which we call the dissipative spectral form factor (DSFF), to characterize the...
We discuss spectral correlations in coarse-grained chaotic two-dimensional CFTs with large central c...
The aim of this work is to study the spectral statistics of the asymmetric rotor model (triaxial rig...
The effect of disorder on the quantum phase transitions induced by a transverse field, anisotropy, a...
In this thesis we investigate the intersection of the three fields of random matrix theory, quantum ...
We present a random matrix theory for systems invariant under the joint action of parity, P, and tim...