AVERAGES OF UNLABELED NETWORKS: GEOMETRIC CHARACTERIZATION AND ASYMPTOTIC BEHAVIOR
成果类型:
Article
署名作者:
Kolaczyk, Eric D.; Lin, Lizhen; Rosenberg, Steven; Walters, Jackson; Xu, Jie
署名单位:
Boston University; University of Notre Dame
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/19-AOS1820
发表日期:
2020
页码:
514-538
关键词:
extrinsic sample means
uniqueness
MANIFOLDS
SPACE
sets
摘要:
It is becoming increasingly common to see large collections of network data objects, that is, data sets in which a network is viewed as a fundamental unit of observation. As a result, there is a pressing need to develop network-based analogues of even many of the most basic tools already standard for scalar and vector data. In this paper, our focus is on averages of unlabeled, undirected networks with edge weights. Specifically, we (i) characterize a certain notion of the space of all such networks, (ii) describe key topological and geometric properties of this space relevant to doing probability and statistics thereupon, and (iii) use these properties to establish the asymptotic behavior of a generalized notion of an empirical mean under sampling from a distribution supported on this space. Our results rely on a combination of tools from geometry, probability theory and statistical shape analysis. In particular, the lack of vertex labeling necessitates working with a quotient space modding out permutations of labels. This results in a nontrivial geometry for the space of unlabeled networks, which in turn is found to have important implications on the types of probabilistic and statistical results that may be obtained and the techniques needed to obtain them.