Correlation Functions of Operators and Wilson Surfaces in the d=6, (0,2) Theory in the Large N Limit
Richard Corrado, Bogdan Florea, and Robert McNees
TL;DR
This paper calculates correlation functions of operators and Wilson surfaces in the six-dimensional (0,2) superconformal theory at large N, providing insights into the structure of this strongly coupled system.
Contribution
It presents the first computation of operator correlation functions and Wilson surface OPE coefficients in the large N limit of the (0,2) theory.
Findings
Two and three-point functions of chiral primary operators computed.
OPE coefficients of operators from Wilson surface correlations determined.
Results enhance understanding of the operator algebra in the (0,2) theory.
Abstract
We compute the two and three-point correlation functions of chiral primary operators in the large N limit of the (0,2), d=6 superconformal theory. We also consider the operator product expansion of Wilson surfaces in the (0,2) theory and compute the OPE coefficients of the chiral primary operators at large N from the correlation functions of surfaces.
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