TL;DR
This paper analyzes gauge-invariant operators and their correlation functions in N=4 SYM using analytic superspace, classifying operators, exploring protected statuses, and examining superconformal invariants and symmetry properties.
Contribution
It provides a comprehensive classification of operators in N=4 SYM and clarifies their properties using analytic superspace, including protected, unprotected, and semi-protected operators.
Findings
Classification of operators into protected, unprotected, and semi-protected.
Explicit examples of three-point functions violating $U(1)_Y$ symmetry.
Introduction of an invariant tensor $\\cE$ for constructing invariants.
Abstract
The properties of gauge-invariant composite operators and their correlation functions in N=4 SYM are discussed in the analytic superspace formalism. A complete classification of the different types of operators in the theory is given. Operators can be either protected or unprotected according to whether they do not or do have anomalous dimensions, and the analytic superspace formalism allows one to identify which type a given operator is in a straightforward manner. A simple discussion is given of the behaviour of reducible multiplets at threshold. It is pointed out that there is a class of ``semi-protected'' operators which do not have anomalous dimensions but which do not necessarily have non-renormalised three-point functions when the other two operators in the correlator are protected, although two-point functions of such operators are non-renormalised. A complete discussion of…
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