Elliptic recurrence representation of the N=1 superconformal blocks in   the Ramond sector

Leszek Hadasz; Zbigniew Jaskolski; Paulina Suchanek

arXiv:0810.1203·hep-th·August 12, 2011

Elliptic recurrence representation of the N=1 superconformal blocks in the Ramond sector

Leszek Hadasz, Zbigniew Jaskolski, Paulina Suchanek

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TL;DR

This paper derives elliptic recursion relations for 4-point N=1 superconformal blocks in the Ramond sector, providing a new mathematical framework for understanding their structure.

Contribution

It introduces elliptic recursion relations specifically for the Ramond sector superconformal blocks, advancing the theoretical understanding of these structures.

Findings

01

Derived elliptic recursion relations for Ramond sector blocks

02

Provided a new mathematical framework for superconformal blocks

03

Enhanced understanding of N=1 superconformal algebra representations

Abstract

The structure of the 4-point N=1 super-conformal blocks in the Ramond sector is analyzed. The elliptic recursion relations for these blocks are derived.

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