Litcius/Paper detail

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

Ilija Burić, Sylvain Lacroix, Jeremy A. Mann, Lorenzo Quintavalle, Volker Schomerus

2021Journal of High Energy Physics35 citationsDOIOpen Access PDF

Abstract

A bstract 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.

Topics & Concepts

Vertex (graph theory)Conformal field theoryConformal mapIntegrable systemEmbeddingEigenfunctionMathematicsDifferential operatorTensor (intrinsic definition)Pure mathematicsMathematical physicsCombinatoricsPhysicsMathematical analysisEigenvalues and eigenvectorsQuantum mechanicsComputer scienceGraphArtificial intelligenceAlgebraic structures and combinatorial modelsNonlinear Waves and SolitonsBlack Holes and Theoretical Physics