Exploring critical systems under measurements and decoherence via
Keldysh field theory
- URL: http://arxiv.org/abs/2304.08277v1
- Date: Mon, 17 Apr 2023 13:48:09 GMT
- Title: Exploring critical systems under measurements and decoherence via
Keldysh field theory
- Authors: Ruochen Ma
- Abstract summary: We employ an $n$-replica Keldysh field theory to investigate the effects of measurements and decoherence on long distance behaviors of quantum critical states.
Low energy effective theories for various scenarios are then derived using the symmetry and fundamental consistency conditions of the Keldysh formalism.
Our results demonstrate that the Keldysh formalism is a useful tool for systematically studying the effects of measurements and decoherence on long-wavelength physics.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We employ an $n$-replica Keldysh field theory to investigate the effects of
measurements and decoherence on long distance behaviors of quantum critical
states. We classify different measurements and decoherence based on their
timescales and symmetry properties, and demonstrate that they can be described
by $n$-replica Keldysh field theories with distinct physical and replica
symmetries. Low energy effective theories for various scenarios are then
derived using the symmetry and fundamental consistency conditions of the
Keldysh formalism. We apply this framework to study the critical Ising model in
both one and two spatial dimensions. In one dimension, we demonstrate that (1)
measurements over a finite period of time along the transverse spin direction
do not modify the asymptotic scaling of correlation functions and entanglement
entropy, whereas (2) measurements along the longitudinal spin direction lead to
an area law entangled phase. We also show that (3) decoherence noises over a
finite time can be mapped to specific boundary conditions of a critical
Ashkin-Teller model, and the entanglement characteristics of the resulting
mixed state can be determined. For measurements and decoherence over an
extensive time, we demonstrate that (4) the von Neumann entanglement entropy of
a large subsystem can exhibit a (sub-)dominant logarithmic scaling in the
stationary state for weak measurement (decoherence) performed in a basis that
is symmetric under the Ising symmetry, but (5) reduces to an area law for
measurements and decoherence in the longitudinal direction. Our results
demonstrate that the Keldysh formalism is a useful tool for systematically
studying the effects of measurements and decoherence on long-wavelength
physics.
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