估计员
一致性(知识库)
数学
随机图
维数(图论)
随机变量
趋同(经济学)
多元随机变量
强一致性
内在维度
收敛速度
估计理论
可扩展性
图形
应用数学
算法
计算机科学
统计
组合数学
离散数学
经济
维数之咒
频道(广播)
数据库
计算机网络
经济增长
作者
Jonathan R. Stewart,Michael Schweinberger
摘要
An important question in statistical network analysis is how to estimate models of discrete and dependent network data with intractable likelihood functions, without sacrificing computational scalability and statistical guarantees. We demonstrate that scalable estimation of random graph models with dependent edges is possible, by establishing convergence rates of pseudo-likelihood-based M-estimators for discrete undirected graphical models with exponential parameterizations and parameter vectors of increasing dimension in single-observation scenarios. We highlight the impact of two complex phenomena on the convergence rate: phase transitions and model near-degeneracy. The main results have possible applications to discrete and dependent network, spatial, and temporal data. To showcase convergence rates, we introduce a novel class of generalized β-models with dependent edges and parameter vectors of increasing dimension, which leverage additional structure in the form of overlapping subpopulations to control dependence. We establish convergence rates of pseudo-likelihood-based M-estimators for generalized β-models in dense- and sparse-graph settings.
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