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Scaling of disorder operator at (2+1)d U(1) quantum criticality

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arxiv 2101.10358 v2 pith:OBKBHJBB submitted 2021-01-25 cond-mat.str-el hep-th

Scaling of disorder operator at (2+1)d U(1) quantum criticality

classification cond-mat.str-el hep-th
keywords disordercornerexponentoperatorquantumregionscalingacross
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We study disorder operator, defined as a symmetry transformation applied to a finite region, across a continuous quantum phase transition in $(2+1)d$. We show analytically that at a conformally-invariant critical point with U(1) symmetry, the disorder operator with a small U(1) rotation angle defined on a rectangle region exhibits power-law scaling with the perimeter of the rectangle. The exponent is proportional to the current central charge of the critical theory. Such a universal scaling behavior is due to the sharp corners of the region and we further obtain a general formula for the exponent when the corner is nearly smooth. To probe the full parameter regime, we carry out systematic computation of the U(1) disorder parameter in the square lattice Bose-Hubbard model across the superfluid-insulator transition with large-scale quantum Monte Carlo simulations, and confirm the presence of the universal corner correction. The exponent of the corner term determined from numerical simulations agrees well with the analytical predictions.

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Cited by 3 Pith papers

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