arXiv:1405.3212 Abstract | arXiv Analytics

arXiv:1405.3212 [cond-mat.stat-mech]Abstract References Reviews Resources

Geometric Critical Exponents in Classical and Quantum Phase Transitions

Published 2014-05-13, updated 2014-11-02Version 3

We define geometric critical exponents for systems that undergo continuous second order classical and quantum phase transitions. These relate scalar quantities on the information theoretic parameter manifolds of such systems, near criticality. We calculate these exponents by approximating the metric and thereby solving geodesic equations analytically, near curvature singularities of two dimensional parameter manifolds. The critical exponents are seen to be the same for both classical and quantum systems that we consider, and we provide evidence about the possible universality of our results.

Comments: 1 + 15 pages, LaTeX. Expanded version with several new examples added. Main results and conclusions are unchanged. Version to appear in Phys. Rev. E

DOI: 10.1103/PhysRevE.90.042145

Categories: cond-mat.stat-mech, hep-th

Subjects: 05.70.Fh, 02.40.-k, 05.70.Jk

Keywords: quantum phase transitions, geometric critical exponents, continuous second order classical, information theoretic parameter manifolds, relate scalar quantities

Tags: journal article

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