Emergent non-Hermitian localization phenomena in the synthetic space of zero-dimensional bosonic systems

TL;DR

This paper demonstrates how non-Hermitian localization phenomena, including the skin effect and exceptional points, can emerge in the synthetic space of zero-dimensional bosonic systems, enabling simulation of complex transitions without elaborate lattice structures.

Contribution

It introduces a method to observe non-Hermitian localization phenomena in low-dimensional bosonic systems via synthetic field moments space, bypassing the need for complex lattice constructions.

Findings

Non-Hermitian skin effect can occur in synthetic field moments space.

Higher-order moments form a synthetic 1D non-Hermitian Hamiltonian.

Experimental verification is feasible with current optical setups.

Abstract

Phase transitions in non-Hermitian systems are at the focus of cutting edge theoretical and experimental research. On the one hand, parity-time- ($\cal PT$-) and anti-$\cal PT$-symmetric physics have gained ever-growing interest, due to the existence of non-Hermitian spectral singularities called exceptional points (EPs). On the other, topological and localization transitions in non-Hermitian systems reveal new phenomena, e.g., the non-Hermitian skin effect and the absence of conventional bulk-boundary correspondence. The great majority of previous studies exclusively focus on non-Hermitian Hamiltonians, whose realization requires an {\it a priori} fine-tuned extended lattices to exhibit topological and localization transition phenomena.In this work, we show how the non-Hermitian localization phenomena can naturally emerge in the synthetic field moments space of zero-dimensional bosonic systems, e.g., in anti-$\cal PT$ and $\cal PT$-symmetric quantum dimers. This offers an opportunity to simulate localization transitions in low-dimensional systems, without the need to construct complex arrays of, e.g., coupled cavities or waveguides. Indeed, the field moment equations of motion can describe an equivalent (quasi-)particle moving in a one-dimensional (1D) synthetic lattice. This synthetic field moments space can exhibit a nontrivial localization phenomena, such as non-Hermitian skin effect, induced by the presence of highly-degenerate EPs. We demonstrate our findings on the example of an anti-$\cal PT$-symmetric two-mode system, whose higher-order field moments eigenspace is emulated by a synthetic 1D non-Hermitian Hamiltonian having a Sylvester matrix shape. Our results can be directly verified in state-of-the-art optical setups, such as superconducting circuits and toroidal resonators, by measuring photon moments or correlation functions.