Related papers: Solvable entanglement dynamics in quantum circuits with generalized dual unitarity

Solvable entanglement dynamics in quantum circuits with generalized dual unitarity

URL: http://arxiv.org/abs/2312.12239v1
Date: Tue, 19 Dec 2023 15:23:55 GMT
Title: Solvable entanglement dynamics in quantum circuits with generalized dual unitarity
Authors: Chuan Liu, Wen Wei Ho
Abstract summary: We study the non-equilibrium dynamics of kicked Ising models in $1+1$ dimensions. These models give rise to time-evolution equivalent to quantum circuits.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We study the non-equilibrium dynamics of kicked Ising models in $1+1$ dimensions which have interactions alternating between odd and even bonds in time. These models give rise to time-evolution equivalent to quantum circuits having both the global property of tri-unitarity (three 'arrows of time') and also the local property of second-level dual-unitarity, which constrains the behavior of pairs of local gates underlying the circuit under a space-time rotation. We identify a broad class of initial product states wherein the effect of the environment on a small subsystem can be exactly represented by influence matrices with simple Markovian structures, resulting in the subsystem's full dynamics being efficiently computable. We further find additional conditions under which the dynamics of entanglement can be solved for all times, yielding rich phenomenology ranging from linear growth at half the maximal speed allowed by locality, followed by saturation to maximum entropy (i.e., thermalization to infinite temperature); to entanglement growth with saturation to extensive but sub-maximal entropy. Our findings extend our knowledge of interacting quantum systems whose thermalizing dynamics can be efficiently and analytically computed, going beyond the well-known examples of integrable models, Clifford circuits, and dual-unitary circuits.

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