Litcius/Paper detail

Lessons from the Ramond sector

Nathan Benjamin, Ying-Hsuan Lin

2020SciPost Physics26 citationsDOIOpen Access PDF

Abstract

We revisit the consistency of torus partition functions in (1+1)d fermionic conformal field theories, combining old ingredients of modular invariance/covariance with a modernized understanding of bosonization/fermionization dualities. Various lessons can be learned by simply examining the oft-ignored Ramond sector. For several extremal/kinky modular functions in the bootstrap literature, we can either rule out or identify the underlying theory. We also revisit the N = 1 Maloney-Witten partition function by calculating the spectrum in the Ramond sector, and further extending it to include the modular sum of seed Ramond characters. Finally, we perform the full N = 1 RNS modular bootstrap and obtain new universal results on the existence of relevant deformations preserving different amounts of supersymmetry.

Topics & Concepts

Modular designTorusPartition function (quantum field theory)Conformal mapModular invarianceFunction (biology)Conformal field theoryConsistency (knowledge bases)MathematicsPartition (number theory)Computer scienceField (mathematics)Spectrum (functional analysis)Modular formPure mathematicsTheoretical computer scienceModular curveTheoretical physicsQuantum Chromodynamics and Particle InteractionsAlgebraic structures and combinatorial modelsBlack Holes and Theoretical Physics