Defects and quantum Seiberg-Witten geometry

Abstract: Abstract:We study the Nekrasov partition function of the five dimensional U(N ) gauge theory with maximal supersymmetry on R 4 ×S 1 in the presence of codimension two defects. The codimension two defects can be described either as monodromy defects, or by coupling to a certain class of three dimensional quiver gauge theories on R 2 × S 1 . We explain how these computations are connected with both classical and quantum integrable systems. We check, as an expansion in the instanton number, that the aforementione… Show more

“…m j denote of course real masses for the SU(N + k) symmetry in theory (A) and FI parameters in theory (B). Note that (4.47) was proven in [23] for a general value of m A . 5 Equation (4.47) implies the equality between the following two parition functions (as in (4.47)):…”

“…Exploiting the fact that (2.28) is true for generic (complex) values of m A (as was proven in [23]), we can immediately derive the equality of S 3 b partition functions for our deformed T (SU(N )) theory and its mirror since this simply follows from a specialization of (2.28): on one side the monopole superpotential breaks the topological symmetries and H − C to the diagonal subgroup, therefore all the ξ i parameters and m A should be identified. This sets the real parts of all ξ i and m A to a single parameter which we shall denote by ξ.…”

“…This forces us to mix the R-symmetry with a certain combination of the Cartan components of the (now broken) SU(N ) Higgs branch (HB) symmetry. Specifically, the generator which replaces 23) and the trial R-symmetry becomes…”

Mirror theories of 3d $$ \mathcal{N} $$ = 2 SQCD

“…m j denote of course real masses for the SU(N + k) symmetry in theory (A) and FI parameters in theory (B). Note that (4.47) was proven in [23] for a general value of m A . 5 Equation (4.47) implies the equality between the following two parition functions (as in (4.47)):…”

“…Exploiting the fact that (2.28) is true for generic (complex) values of m A (as was proven in [23]), we can immediately derive the equality of S 3 b partition functions for our deformed T (SU(N )) theory and its mirror since this simply follows from a specialization of (2.28): on one side the monopole superpotential breaks the topological symmetries and H − C to the diagonal subgroup, therefore all the ξ i parameters and m A should be identified. This sets the real parts of all ξ i and m A to a single parameter which we shall denote by ξ.…”

“…This forces us to mix the R-symmetry with a certain combination of the Cartan components of the (now broken) SU(N ) Higgs branch (HB) symmetry. Specifically, the generator which replaces 23) and the trial R-symmetry becomes…”

Mirror theories of 3d $$ \mathcal{N} $$ = 2 SQCD

“…In the case of 6d N = (2, 0) SCFTs, the relevant calculations in the "chiral algebra" limit are presented in [71]. For general parameters, it may also be possible to extend the 5d partition function computations of section 3 to include defects using results from [72,73]. The 4d N = 2 superconformal index in the presence of various kinds of defects has also been computed in [54,[74][75][76], which may provide a starting point.…”

Supersymmetric Casimir energy and the anomaly polynomial

“…. , h N } are not in general the eigenvalues of H. The holonomy matrix H can be identified with the Lax matrix of the complex N -body trigonometric Ruijsenaars-Schneider model [24,25] and therefore methods from classical JHEP04(2017)170 integrable systems are very useful. In particular, a convenient set of invariant functions on M is obtained by expanding the Lax determinants…”

Refined 3d-3d correspondence