Journal of High Energy Physics (Nov 2021)

Gaudin models and multipoint conformal blocks. Part II. Comb channel vertices in 3D and 4D

  • Ilija Burić,
  • Sylvain Lacroix,
  • Jeremy Mann,
  • Lorenzo Quintavalle,
  • Volker Schomerus

DOI
https://doi.org/10.1007/JHEP11(2021)182
Journal volume & issue
Vol. 2021, no. 11
pp. 1 – 69

Abstract

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Abstract It was recently shown that multi-point conformal blocks in higher dimensional conformal field theory can be considered as joint eigenfunctions for a system of commuting differential operators. The latter arise as Hamiltonians of a Gaudin integrable system. In this work we address the reduced fourth order differential operators that measure the choice of 3-point tensor structures for all vertices of 3- and 4-dimensional comb channel conformal blocks. These vertices come associated with a single cross ratio. Remarkably, we identify the vertex operators as Hamiltonians of a crystallographic elliptic Calogero-Moser-Sutherland model that was discovered originally by Etingof, Felder, Ma and Veselov. Our construction is based on a further development of the embedding space formalism for mixed-symmetry tensor fields. The results thereby also apply to comb channel vertices of 5- and 6-point functions in arbitrary dimension.

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