An exact formula for three-point functions in critical loop models is proposed and validated using conformal bootstrap, transfer-matrix lattice studies, and conformal loop ensembles with Liouville quantum gravity.
Title resolution pending
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
verdicts
UNVERDICTED 3representative citing papers
Conjecture of an exact formula for 3-point functions of ℓ-leg and diagonal fields in critical loop models, supported by transfer-matrix numerics on cylinders that agree in most cases.
Simulations show critical strongly connected clusters remain fractal objects with dimension-dependent scaling: hyperscaling below d=6, mean-field above, and double power-law scaling on complete graphs.
citing papers explorer
-
Exact solution of three-point functions in critical loop models
An exact formula for three-point functions in critical loop models is proposed and validated using conformal bootstrap, transfer-matrix lattice studies, and conformal loop ensembles with Liouville quantum gravity.
-
Three-point functions in critical loop models
Conjecture of an exact formula for 3-point functions of ℓ-leg and diagonal fields in critical loop models, supported by transfer-matrix numerics on cylinders that agree in most cases.
-
Percolation transition of strongly connected clusters in finite dimensions and on complete graphs
Simulations show critical strongly connected clusters remain fractal objects with dimension-dependent scaling: hyperscaling below d=6, mean-field above, and double power-law scaling on complete graphs.