TY - JOUR
T1 - Gaussian-width gradient complexity, reverse log-Sobolev inequalities and nonlinear large deviations
AU - Eldan, Ronen
N1 - Publisher Copyright: © 2018, Springer Nature Switzerland AG.
PY - 2018/12
Y1 - 2018/12
N2 - We prove structure theorems for measures on the discrete cube and on Gaussian space, which provide sufficient conditions for mean-field behavior. These conditions rely on a new notion of complexity for such measures, namely the Gaussian-width of the gradient of the log-density. On the cube {-1, 1}(n), we show that a measure. Thus, our framework can be used to study the behavior of low-complexity measures beyond approximation of the partition function, showing that those measures are roughly mixtures of product measures whose entropy is close to that of the original measure. In particular, as a corollary of our theorems, we derive a bound for the naive mean-field approximation of the log-partition function which improves the nonlinear large deviation framework of Chatterjee and Dembo (Adv Math, 319:313-347, 2017. ISSN 0001-8708. https://dx.doi.org/10.1016/j.aim.2017.08.003) in several ways: (1) It does not require any bounds on second derivatives. (2) The covering number is replaced by the weaker notion of Gaussian-width. (3) We obtain stronger asymptotics with respect to the dimension. Two other corollaries are decomposition theorems for exponential random graphs and large-degree Ising models. In the Gaussian case, we show that measures of low-complexity exhibit an almost-tight reverse log-Sobolev inequality.
AB - We prove structure theorems for measures on the discrete cube and on Gaussian space, which provide sufficient conditions for mean-field behavior. These conditions rely on a new notion of complexity for such measures, namely the Gaussian-width of the gradient of the log-density. On the cube {-1, 1}(n), we show that a measure. Thus, our framework can be used to study the behavior of low-complexity measures beyond approximation of the partition function, showing that those measures are roughly mixtures of product measures whose entropy is close to that of the original measure. In particular, as a corollary of our theorems, we derive a bound for the naive mean-field approximation of the log-partition function which improves the nonlinear large deviation framework of Chatterjee and Dembo (Adv Math, 319:313-347, 2017. ISSN 0001-8708. https://dx.doi.org/10.1016/j.aim.2017.08.003) in several ways: (1) It does not require any bounds on second derivatives. (2) The covering number is replaced by the weaker notion of Gaussian-width. (3) We obtain stronger asymptotics with respect to the dimension. Two other corollaries are decomposition theorems for exponential random graphs and large-degree Ising models. In the Gaussian case, we show that measures of low-complexity exhibit an almost-tight reverse log-Sobolev inequality.
UR - http://www.scopus.com/inward/record.url?scp=85052148914&partnerID=8YFLogxK
U2 - https://doi.org/10.1007/s00039-018-0461-z
DO - https://doi.org/10.1007/s00039-018-0461-z
M3 - مقالة
SN - 1016-443X
VL - 28
SP - 1548
EP - 1596
JO - Geometric and Functional Analysis
JF - Geometric and Functional Analysis
IS - 6
ER -