On homomorphisms from finite subgroups of SU(2) to Langlands dual pairs of groups

Abstract

Let N(,G) be the number of homomorphisms from to G up to conjugation by G. Physics of four-dimensional N=4 supersymmetric gauge theories predicts that N(,G)=N( , G) when is a finite subgroup of SU(2), G is a connected compact simple Lie group and G is its Langlands dual. This statement is known to be true when =Zn, but the statement for non-Abelian is new, to the knowledge of the authors. To lend credence to this conjecture, we prove this equality in a couple of examples, namely (G, G)=(SU(n),PU(n)) and (Sp(n),SO(2n+1)) for arbitrary , and (PSp(n),Spin(2n+1)) for exceptional . A more refined version of the conjecture, together with proofs of some concrete cases, will also be presented. The authors would like to ask mathematicians to provide a more uniform proof applicable to all cases.