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Information geometry of quantum critical submanifolds: relevant, marginal and irrelevant operators

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arxiv 2201.01329 v2 pith:Y2RYAC5B submitted 2022-01-04 cond-mat.mes-hall cond-mat.quant-gashep-thmath-phmath.MPquant-ph

Information geometry of quantum critical submanifolds: relevant, marginal and irrelevant operators

classification cond-mat.mes-hall cond-mat.quant-gashep-thmath-phmath.MPquant-ph
keywords criticaldirectionsmetricsubmanifoldstheoryalongbehaviorgeometry
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We analyze the thermodynamical limit of the quantum metric along critical submanifolds of theory space. Building upon various results previously known in the literature, we relate its singular behavior to normal directions, which are naturally associated with relevant operators in the renormalization group sense. We formulate these results in the language of information theory and differential geometry. We exemplify our theory through the paradigmatic examples of the XY and Haldane models, where the normal directions to the critical submanifolds are seen to be precisely those along which the metric has singular behavior, while for the tangent ones it vanishes -- these directions lie in the kernel of the metric.

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