Related papers: Dynamic transition from insulating state to eta-pairing state in a composite non-Hermitian system

Dynamic transition from insulating state to eta-pairing state in a composite non-Hermitian system

URL: http://arxiv.org/abs/2112.10512v2
Date: Fri, 20 May 2022 02:26:39 GMT
Title: Dynamic transition from insulating state to eta-pairing state in a composite non-Hermitian system
Authors: X. M. Yang and Z. Song
Abstract summary: We study the dynamic transition from a trivial insulating state to an eta-pairing state in a composite non-Hermitian Hubbard system. The speed of relaxation of the off-diagonal long-range order pair state depends on the order of the exceptional point.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The dynamics of Hermitian many-body quantum systems has long been a challenging subject due to the complexity induced by the particle-particle interactions. In contrast, this difficulty may be avoided in a well-designed non-Hermitian system. The exceptional point (EP) in a non-Hermitian system admits a peculiar dynamics: the final state being a particular eigenstate, coalescing state. In this work, we study the dynamic transition from a trivial insulating state to an {\eta}-pairing state in a composite non-Hermitian Hubbard system. The system consists of two subsystems, A and B, which are connected by unidirectional hoppings.We show that the dynamic transition from an insulating state to an {\eta}-pairing state occurs by the probability flow from A to B: the initial state is prepared as an insulating state of A, while B is left empty. The final state is an {\eta}-pairing state in B but empty in A. Analytical analyses and numerical simulations show that the speed of relaxation of the off-diagonal long-range order pair state depends on the order of the EP, which is determined by the number of pairs and the fidelity of the scheme is immune to the irregularity of the lattice.

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