Black holes, instanton counting on toric singularities and q-deformed two-dimensional Yang-Mills theory

We study the relationship between instanton counting in N = 4 Yang-Mills theory on a generic four-dimensional toric orbifold and the semi-classical expansion of cl-deformed Yang-Mills theory on the blowups of the minimal resolution of the orbifold singularity, with an eye to clarifying the recent proposal of using two-dimensional gauge theories to count microstates of black holes in four dimensions. We describe explicitly the instanton contributions to the counting of D-brane bound states which are captured by the two-dimensional gauge theory. We derive an intimate relationship between the two-dimensional Yang-Mills theory and Chern-Simons theory on generic Lens spaces, and use it to show that the known instanton counting is only reproduced when the Chern-Simons contributions are treated as non-dynamical boundary conditions in the D4-brane gauge theory. We also use this correspondence to discuss the counting of instantons on higher genus ruled Riemann surfaces. (c) 2007 Elsevier B.V. All rights reserved.