Chern-Simons theory with the exceptional gauge group as a refined topological string

Abstract

We present the partition function of Chern-Simons theory with the exceptional gauge group on three-sphere in the form of a partition function of the refined closed topological string with relation 2τ=gs(1-b) between single K\"ahler parameter τ, string coupling constant gs and refinement parameter b, where b=53,52,3,4,6 for G2, F4, E6, E7, E8, respectively. The non-zero BPS invariants NdJL,JR (d - degree) are N20,12=1, N110,1=1. Besides these terms, partition function of Chern-Simons theory contains term corresponding to the refined constant maps of string theory. Derivation is based on the universal (in Vogel's sense) form of a Chern-Simons partition function on three-sphere, restricted to exceptional line Exc with Vogel's parameters satisfying γ=2(α+β). This line contains points, corresponding to the all exceptional groups. The same results are obtained for F line γ=α+β (containing SU(4), SO(10) and E6 groups), with the non-zero N20,12=1, N70,1=1. In both cases refinement parameter b (=-ε2/ε1 in terms of Nekrasov's parameters) is given in terms of universal parameters, restricted to the line, by b=-β/α.