Asosiy kontentga oʻtish
AkademIndex

Mahsulotlar

Ishlab chiquvchilar uchun

AkademBaseEkotizim uchun ochiq API
Maqola

Entanglement production in bosonic systems: Linear and logarithmic growth

Lucas HacklDepartment of Physics, The Pennsylvania State University, University Park, Pennsylvania 16802, USAEugenio BianchiDepartment of Physics, The Pennsylvania State University, University Park, Pennsylvania 16802, USARanjan ModakDepartment of Physics, The Pennsylvania State University, University Park, Pennsylvania 16802, USAMarcos RigolDepartment of Physics, The Pennsylvania State University, University Park, Pennsylvania 16802, USA
2018en
ABI

Annotatsiya

We study the time evolution of the entanglement entropy in bosonic systems with time-independent, or time-periodic, Hamiltonians. In the first part, we focus on quadratic Hamiltonians and Gaussian initial states. We show that all quadratic Hamiltonians can be decomposed into three parts: (a) unstable, (b) stable, and (c) metastable. If present, each part contributes in a characteristic way to the time dependence of the entanglement entropy: (a) linear production, (b) bounded oscillations, and (c) logarithmic production. In the second part, we use numerical calculations to go beyond Gaussian states and quadratic Hamiltonians. We provide numerical evidence for the conjecture that entanglement production through quadratic Hamiltonians has the same asymptotic behavior for non-Gaussian initial states as for Gaussian ones. Moreover, even for nonquadratic Hamiltonians, we find a similar behavior at intermediate times. Our results are of relevance to understanding entanglement production for quantum fields in dynamical backgrounds and ultracold atoms in optical lattices.

Hali tarjima qilinmagan

Identifikatorlar

Iqtiboslar va manbalar

2 ta iqtibos0 ta foydalanilgan manba