Braiding properties of the N=1 super-conformal blocks (Ramond sector)
Damian Chorazkiewicz, Leszek Hadasz, Zbigniew Jaskolski
TL;DR
This paper develops a method to calculate braiding matrices for N=1 super-conformal 4-point blocks with Ramond external weights, providing explicit formulas for various cases.
Contribution
Introduces a super scalar field approach to compute braiding matrices for N=1 super-conformal blocks involving Ramond sectors, advancing analytical techniques.
Findings
Derived explicit analytic formulas for braiding matrices
Applicable to all types of N=1 super-conformal 4-point blocks with Ramond weights
Enhanced understanding of super-conformal field theory structures
Abstract
Using a super scalar field representation of the chiral vertex operators we develop a general method of calculating braiding matrices for all types of N=1 super-conformal 4-point blocks involving Ramond external weights. We give explicit analytic formulae in a number of cases.
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