The low-energy spectrum of (2,0) theory on T5 x R

Abstract

We consider the ADE-series of (2, 0) supersymmetric quantum theories on T5 × R, where the first factor is a flat spatial five-torus, and the second factor denotes time. The quantum states of such a theory are characterized by a discrete quantum number f ∈ H3 (T5, C), where the finite abelian group C is the center subgroup of the corresponding simply connected simply laced Lie group G. At energies that are low compared to the inverse size of the T5, the spectrum consists of a set of continua of states, each of which is characterized by the value of f and some number 5r of additional continuous parameters. By exploiting the interpretation of this theory as the ultraviolet completion of maximally supersymmetric Yang-Mills theory on T4 × S1 × R with gauge group Gadj = G/C and coupling constant g given by the square root of the radius of the S1 factor, one may compute the number Nfr () of such continua. We perform these calculations in detail for the A- and D-series. While the Yang-Mills theory formalism is manifestly invariant under the 4 (Z) mapping class group of T4, the results are actually found to be invariant under the 5 (Z) mapping class group of T5, which provides a strong consistency check.