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.
On three-point connectivity in two-dimensional percolation
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
abstract
We argue the exact universal result for the three-point connectivity of critical percolation in two dimensions. Predictions for Potts clusters and for the scaling limit below p_c are also given.
verdicts
UNVERDICTED 3representative citing papers
Torus one-point functions of primary fields in critical loop models are infinite sums of conformal blocks whose coefficients are products of double Gamma functions and polynomials in the loop weight, obtained via numerical bootstrap from sphere four-point functions at different central charge.
Proposes that AdS3 gravity at finite cutoff is dual to a CFT2 coupled to timelike Liouville theory deformed by a marginal operator, with checks via semiclassical partition functions and EOM matching.
citing papers explorer
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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.
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Torus one-point functions in critical loop models
Torus one-point functions of primary fields in critical loop models are infinite sums of conformal blocks whose coefficients are products of double Gamma functions and polynomials in the loop weight, obtained via numerical bootstrap from sphere four-point functions at different central charge.
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Timelike Liouville theory and AdS$_3$ gravity at finite cutoff
Proposes that AdS3 gravity at finite cutoff is dual to a CFT2 coupled to timelike Liouville theory deformed by a marginal operator, with checks via semiclassical partition functions and EOM matching.