Self-Duality and Self-Similarity of Little String Orbifolds

Abstract

We study a class of N=(1,0) little string theories obtained from orbifolds of M-brane configurations. These are realised in two different ways that are dual to each other: either as M parallel M5-branes probing a transverse AN-1 singularity or N M5-branes probing an AM-1 singularity. These backgrounds can further be dualised into toric, non-compact Calabi-Yau threefolds XN,M which have double elliptic fibrations and thus give a natural geometric description of T-duality of the little string theories. The little string partition functions are captured by the topological string partition function of XN,M. We analyse in detail the free energies N,M associated with the latter in a special region in the K\"ahler moduli space of XN,M and discover a remarkable property: in the Nekrasov-Shatashvili-limit, N,M is identical to NM times 1,1. This entails that the BPS degeneracies for any (N,M) can uniquely be reconstructed from the (N,M)=(1,1) configuration, a property we refer to as self-similarity. Moreover, as 1,1 is known to display a number of recursive structures, BPS degeneracies of little string configurations for arbitrary (N,M) as well acquire additional symmetries. These symmetries suggest that in this special region the two little string theories described above are self-dual under T-duality.