Your search keyword '"operator, differential"' showing total 2 results

1. Gaudin models and multipoint conformal blocks: general theory

Author

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

Subjects

High Energy Physics - Theory, Nuclear and High Energy Physics, Pure mathematics, operator, differential, Integrable system, integrability [model], Open problem, conformal block, Dimension (graph theory), FOS: Physical sciences, Conformal map, QC770-798, 01 natural sciences, operator product expansion, Nuclear and particle physics. Atomic energy. Radioactivity, 0103 physical sciences, ddc:530, Differential and Algebraic Geometry, model, integrability, correlation function, 010306 general physics, conformal [field theory], Eigenvalues and eigenvectors, field theory: conformal, Physics, Conformal Field Theory, Series (mathematics), Gaudin model, 010308 nuclear & particles physics, Conformal field theory, Space-Time Symmetries, Integrable Hierarchies, Differential operator, differential [operator], model: integrability, operator: differential, High Energy Physics - Theory (hep-th), higher-dimensional, field theory, conformal

Abstract

Journal of high energy physics 10(10), 139 (2021). doi:10.1007/JHEP10(2021)139, The construction of conformal blocks for the analysis of multipoint correlation functions with N > 4 local field insertions is an important open problem in higher dimensional conformal field theory. This is the first in a series of papers in which we address this challenge, following and extending our short announcement in [1]. According to Dolan and Osborn, conformal blocks can be determined from the set of differential eigenvalue equations that they satisfy. We construct a complete set of commuting differential operators that characterize multipoint conformal blocks for any number N of points in any dimension and for any choice of OPE channel through the relation with Gaudin integrable models we uncovered in [1]. For 5-point conformal blocks, there exist five such operators which are worked out smoothly in the dimension d., Published by SISSA, [Trieste]

Published

2021

2. Gaudin Models and Multipoint Conformal Blocks: General Theory

Author

Buric, Ilija, Lacroix, Sylvain, Mann, Jeremy, Quintavalle, Lorenzo, and Schomerus, Volker

Subjects

operator, differential, Gaudin model, conformal block, model, integrability, correlation function, higher-dimensional, field theory, conformal, operator product expansion

Abstract

The construction of conformal blocks for the analysis of multipoint correlation functions with $N > 4$ local field insertions is an important open problem in higher dimensional conformal field theory. This is the first in a series of papers in which we address this challenge, following and extending our short announcement in [Phys. Rev. Lett. 126, 021602]. According to Dolan and Osborn, conformal blocks can be determined from the set of differential eigenvalue equations that they satisfy. We construct a complete set of commuting differential operators that characterize multipoint conformal blocks for any number $N$ of points in any dimension and for any choice of OPE channel through the relation with Gaudin integrable models we uncovered in [Phys. Rev. Lett. 126, 021602]. For 5-point conformal blocks, there exist five such operators which are worked out smoothly in the dimension $d$.

Published

2021