Abstract
We consider the exact coupling constant dependence of extremal correlation functions of ${\cal N} = 2$ chiral primary operators in 4d ${\cal N} = 2$ superconformal gauge theories with gauge group SU(N) and N_f=2N massless fundamental hypermultiplets. The 2- and 3-point functions, viewed as functions of the exactly marginal coupling constant and theta angle, obey the tt* equations. In the case at hand, the tt* equations form a set of complicated non-linear coupled matrix equations. We point out that there is an ad hoc self-consistent ansatz that reduces this set of partial differential equations to a sequence of decoupled semi-infinite Toda chains, similar to the one encountered previously in the special case of SU(2) gauge group. This ansatz requires a surprising new non-renormalization theorem in ${\cal N} = 2$ superconformal field theories. We derive a general 3-loop perturbative formula for 2- and 3-point functions in the ${\cal N} = 2$ chiral ring of the SU(N) theory, and in all explicitly computed examples we find agreement with the tt* equations, as well as the above-mentioned ansatz. This is suggestive evidence for an interesting non-perturbative conjecture about the structure of the ${\cal N} = 2$ chiral ring in this class of theories. We discuss several implications of this conjecture. For example, it implies that the holonomy of the vector bundles of chiral primaries over the superconformal manifold is reducible. It also implies that a specific subset of extremal correlation functions can be computed in the SU(N) theory using information solely from the S^4 partition function of the theory obtained by supersymmetric localization.
Highlights
We discuss several implications of this conjecture. It implies that the holonomy of the vector bundles of chiral primaries over the superconformal manifold is reducible. It implies that a specific subset of extremal correlation functions can be computed in the SU(N ) theory using information solely from the S4 partition function of the theory obtained by supersymmetric localization
In four-dimensional examples, e.g. the SU(2) N = 2 super-Yang-Mills (SYM) theory coupled to 4 hypermultiplets, known as SU(2) N = 2 superconformal QCD (SCQCD), which was analyzed in [4, 6], the tt∗ equations reduce to a Toda chain, but in this case the chain is semi-infinite
We further show that the no-mixing conjecture allows to extract more information from the S4 partition function for additional extremal correlation functions
Summary
ΦK+L denotes the multi-trace operator : φKφL : and the dots represent descendants with higher scaling dimension In these normalization conventions the tt∗ equations become a coupled set of matrix partial differential equations. As we explain in the main text, the next-to-leading order perturbative results in this paper do not allow us to check conclusively the no-mixing properties for all possible 2-point functions They only allow us to find direct non-trivial evidence of the absence of mixing for degenerate operators that contain ‘a different number of Tr φ2 factors’. This leaves open the possibility of a partial mixing in gauge theory, where at generic scaling dimensions the 2-point functions are non-perturbatively block-diagonal instead of completely diagonal. We further show that the no-mixing conjecture allows to extract more information from the S4 partition function for additional extremal correlation functions
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Disclaimer: All third-party content on this website/platform is and will remain the property of their respective owners and is provided on "as is" basis without any warranties, express or implied. Use of third-party content does not indicate any affiliation, sponsorship with or endorsement by them. Any references to third-party content is to identify the corresponding services and shall be considered fair use under The CopyrightLaw.