Add to ORKGCritical phase transitions contain a variety of deep and universal physics and are intimately tied to thermodynamic quantities through scaling relations. Yet, these notions are challenged in the context of non-Hermiticity, where spatial or temporal divergences render the thermodynamic limit ill-defined. In this work, we show that a thermodynamic grand potential can still be defined in pseudo-Hermitian Hamiltonians, and can be used to characterize aspects of criticality unique to non-Hermitian systems. Using the non-Hermitian Su-Schrieffer-Heeger (SSH) model as a paradigmatic example, we demonstrate the fractional order of topological phase transitions in the complex energy plane. These fractional orders add up to the integer order expected ...
We show that non-Hermitian biorthogonal many-body phase transitions can be characterized by the enha...
A central topic in condensed matter research during the last decades has been the study and classifi...
We develop the perturbation theory of the fidelity susceptibility in biorthogonal bases for arbitrar...
Critical phase transitions contain a variety of deep and universal physics and are intimately tied t...
Recent years have seen a growing interest in topological phases beyond the standard paradigm of gapp...
We investigate the nature of quantum criticality and topological phase transitions near the critical...
Non-Hermitian systems can exhibit extraordinary sensitivity to boundary conditions, where the locali...
Recently, it was discovered that certain non-Hermitian systems can exhibit qualitative different pro...
The Hatano-Nelson and the non-Hermitian Su-Schrieffer-Heeger model are paradigmatic examples of non-...
Non-Hermitian systems with exceptional points lead to many intriguing phenomena due to the coalescen...
Recent years have seen remarkable development in open quantum systems effectively described by non-H...
Non-Hermitian systems have provided a rich platform to study unconventional topological phases. Thes...
Composite topological phases with intriguing topology like M${\"o}$bius strips emerge in sublattice ...
Abstract We investigate the nature of quantum criticality and topological phase transitions near the...
Topological insulators have been studied intensively over the last decades. Earlier research focused...
We show that non-Hermitian biorthogonal many-body phase transitions can be characterized by the enha...
A central topic in condensed matter research during the last decades has been the study and classifi...
We develop the perturbation theory of the fidelity susceptibility in biorthogonal bases for arbitrar...
Critical phase transitions contain a variety of deep and universal physics and are intimately tied t...
Recent years have seen a growing interest in topological phases beyond the standard paradigm of gapp...
We investigate the nature of quantum criticality and topological phase transitions near the critical...
Non-Hermitian systems can exhibit extraordinary sensitivity to boundary conditions, where the locali...
Recently, it was discovered that certain non-Hermitian systems can exhibit qualitative different pro...
The Hatano-Nelson and the non-Hermitian Su-Schrieffer-Heeger model are paradigmatic examples of non-...
Non-Hermitian systems with exceptional points lead to many intriguing phenomena due to the coalescen...
Recent years have seen remarkable development in open quantum systems effectively described by non-H...
Non-Hermitian systems have provided a rich platform to study unconventional topological phases. Thes...
Composite topological phases with intriguing topology like M${\"o}$bius strips emerge in sublattice ...
Abstract We investigate the nature of quantum criticality and topological phase transitions near the...
Topological insulators have been studied intensively over the last decades. Earlier research focused...
We show that non-Hermitian biorthogonal many-body phase transitions can be characterized by the enha...
A central topic in condensed matter research during the last decades has been the study and classifi...
We develop the perturbation theory of the fidelity susceptibility in biorthogonal bases for arbitrar...