Liouville quantum gravity and KPZ
成果类型:
Article
署名作者:
Duplantier, Bertrand; Sheffield, Scott
署名单位:
CEA; Centre National de la Recherche Scientifique (CNRS); Universite Paris Saclay; Massachusetts Institute of Technology (MIT)
刊物名称:
INVENTIONES MATHEMATICAE
ISSN/ISSBN:
0020-9910
DOI:
10.1007/s00222-010-0308-1
发表日期:
2011
页码:
333-393
关键词:
brownian intersection exponents
planar random lattice
random surface
matrix model
field-theory
o(n) model
fractal structure
critical-behavior
SCALING LIMITS
hard particles
摘要:
Consider a bounded planar domain D, an instance h of the Gaussian free field on D, with Dirichlet energy (2 pi)(-1) integral(D) del h(z) . del h(z)dz, and a constant 0 <= gamma < 2. The Liouville quantum gravity measure on D is the weak limit as epsilon -> 0 of the measures epsilon(gamma 2/2)e(gamma h epsilon(z)) dz, where dz is Lebesgue measure on D and h(epsilon)(z) denotes the mean value of h on the circle of radius epsilon centered at z. Given a random (or deterministic) subset X of D one can define the scaling dimension of X using either Lebesgue measure or this random measure. We derive a general quadratic relation between these two dimensions, which we view as a probabilistic formulation of the Knizhnik, Polyakov, Zamolodchikov (Mod. Phys. Lett. A, 3: 819-826, 1988) relation from conformal field theory. We also present a boundary analog of KPZ (for subsets of delta D). We discuss the connection between discrete and continuum quantum gravity and provide a framework for understanding Euclidean scaling exponents via quantum gravity.