Title :
Consistent Latent Position Estimation and Vertex Classification for Random Dot Product Graphs
Author :
Sussman, Daniel L. ; Minh Tang ; Priebe, Carey E.
Author_Institution :
Johns Hopkins Univ., Baltimore, MD, USA
Abstract :
In this work, we show that using the eigen-decomposition of the adjacency matrix, we can consistently estimate latent positions for random dot product graphs provided the latent positions are i.i.d. from some distribution. If class labels are observed for a number of vertices tending to infinity, then we show that the remaining vertices can be classified with error converging to Bayes optimal using the $(k)$-nearest-neighbors classification rule. We evaluate the proposed methods on simulated data and a graph derived from .
Keywords :
Bayes methods; graph theory; learning (artificial intelligence); matrix algebra; pattern classification; Wikipedia; adjacency matrix eigendecomposition; consistent latent position estimation; k-nearest-neighbors classification rule; random dot product graphs; vertex classification; Encyclopedias; Estimation; Internet; Pattern recognition; Random variables; Stochastic processes; Vectors; $(k)$-nearest-neighbor; Random graph; latent space model; universal consistency;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
DOI :
10.1109/TPAMI.2013.135
