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Two-dimensional O(n) models and logarithmic CFTs

Victor Gorbenko, Bernardo Zan

2020Journal of High Energy Physics26 citationsDOIOpen Access PDF

Abstract

A bstract We study O ( n )-symmetric two-dimensional conformal field theories (CFTs) for a continuous range of n below two. These CFTs describe the fixed point behavior of self-avoiding loops. There is a pair of known fixed points connected by an RG flow. When n is equal to two, which corresponds to the Kosterlitz-Thouless critical theory, the fixed points collide. We find that for n generic these CFTs are logarithmic and contain negative norm states; in particular, the O ( n ) currents belong to a staggered logarithmic multiplet. Using a conformal bootstrap approach we trace how the negative norm states decouple at n = 2, restoring unitarity. The IR fixed point possesses a local relevant operator, singlet under all known global symmetries of the CFT, and, nevertheless, it can be reached by an RG flow without tuning. Besides, we observe logarithmic correlators in the closely related Potts model.

Topics & Concepts

Fixed pointPhysicsConformal mapLogarithmConformal field theoryInfrared fixed pointNorm (philosophy)Homogeneous spaceMathematical physicsTRACE (psycholinguistics)Field (mathematics)Conformal symmetryUltraviolet fixed pointTheoretical physicsCentral chargeInverseRenormalization groupFlow (mathematics)Potts modelType (biology)Critical phenomenaAlgebraic structures and combinatorial modelsBlack Holes and Theoretical PhysicsHomotopy and Cohomology in Algebraic Topology