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Operator growth in random quantum circuits with symmetry

3 Pith papers cite this work. Polarity classification is still indexing.

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abstract

We study random quantum circuits with symmetry, where the local 2-site unitaries are drawn from a quotient or subgroup of the full unitary group $U(d)$. Random quantum circuits are minimal models of local quantum chaotic dynamics and can be used to study operator growth and the emergence of diffusive hydrodynamics. We derive the transition probabilities for the stochastic process governing the growth of operators in four classes of symmetric random circuits. We then compute the butterfly velocities and diffusion constants for a spreading operator by solving a simple random walk in each class of circuits.

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Domain-wall melting in all-to-all QSSEP from random-matrix theory

cond-mat.stat-mech · 2026-04-30 · unverdicted · novelty 7.0

In the thermodynamic limit the quantum and classical full-counting statistics of charge coincide exactly with no finite-time corrections, while the averaged von Neumann entanglement entropy admits a fully explicit expression obtained from the Jacobi-process dynamics of correlation-matrix eigenvalues

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  • Domain-wall melting in all-to-all QSSEP from random-matrix theory cond-mat.stat-mech · 2026-04-30 · unverdicted · none · ref 25

    In the thermodynamic limit the quantum and classical full-counting statistics of charge coincide exactly with no finite-time corrections, while the averaged von Neumann entanglement entropy admits a fully explicit expression obtained from the Jacobi-process dynamics of correlation-matrix eigenvalues