New phase in Chern-Simons theory on lens space

Abstract

We consider U(N)k Chern-Simons theory on S3 in Seifert framing and write down the partition function as a unitary matrix model. In the large k and large N limit the eigenvalue density satisfies an upper bound 12πλ where λ=N/(k+N). We study the partition function under saddle point approximation and find that the saddle point equation admits a gapped solution for the eigenvalue density. The on-shell partition function on this solution matches with the partition function in the canonical framing up to a phase. However the eigenvalue density saturates the upper cap at a critical value of λ and ceases to exist beyond that. We find a new phase (called cap-gap phase) in this theory for λ beyond the critical value and see that the on-shell free energy for the cap-gap phase is less than that of the gapped phase. We also check the level-rank duality in the theory and observe that the level-rank dual of the gapped phase is a capped phase whereas the cap-gap phase is level-rank dual to itself.