The arrow of time exhibits nonanalytic behavior at the critical point of measurement-induced phase transitions, with an identified critical exponent, in an exactly solved model of random quantum circuits with non-projective measurements.
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In γ-Ba₃CoNb₂O₉, a disordered cubic spin-1/2 lattice near the percolation threshold, experiments and simulations reveal a disorder-driven dynamical state with short-range correlations and no conventional freezing.
Random spin-orbit coupling systematically lowers the quantum percolation threshold in site-diluted honeycomb lattices while shifting the critical behavior toward the two-dimensional symplectic universality class.
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Arrow of Time as an indicator of Measurement-Induced Phase Transitions
The arrow of time exhibits nonanalytic behavior at the critical point of measurement-induced phase transitions, with an identified critical exponent, in an exactly solved model of random quantum circuits with non-projective measurements.
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Dynamical magnetism in the disordered cubic lattice material $\gamma$-${\rm Ba}_{3}{\rm CoNb}_{2}{\rm O}_{9}$
In γ-Ba₃CoNb₂O₉, a disordered cubic spin-1/2 lattice near the percolation threshold, experiments and simulations reveal a disorder-driven dynamical state with short-range correlations and no conventional freezing.
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Quantum percolation in honeycomb lattices under random spin-orbit coupling
Random spin-orbit coupling systematically lowers the quantum percolation threshold in site-diluted honeycomb lattices while shifting the critical behavior toward the two-dimensional symplectic universality class.