Planting trees in graphs, and finding them back
Abstract
In this paper we study detection and reconstruction of planted structures in Erd\H{o}s-R\'enyi random graphs. Motivated by a problem of communication security, we focus on planted structures that consist in a tree graph. For planted line graphs, we establish the following phase diagram. In a low density region where the average degree of the initial graph is below some critical value , detection and reconstruction go from impossible to easy as the line length crosses some critical value , where is the number of nodes in the graph. In the high density region , detection goes from impossible to easy as goes from to , and reconstruction remains impossible so long as . For -ary trees of varying depth and , we identify a low-density region , such that the following holds. There is a threshold with the following properties. Detection goes from feasible to impossible as crosses . We also show that only partial reconstruction is feasible at best for . We conjecture a similar picture to hold for -ary trees as for lines in the high-density region , but confirm only the following part of this picture: Detection is easy for -ary trees of size , while at best only partial reconstruction is feasible for -ary trees of any size . These results are in contrast with the corresponding picture for detection and reconstruction of {\em low rank} planted structures, such as dense subgraphs and block communities: We observe a discrepancy between detection and reconstruction, the latter being impossible for a wide range of parameters where detection is easy. This property does not hold for previously studied low rank planted structures.
Keywords
Cite
@article{arxiv.1811.01800,
title = {Planting trees in graphs, and finding them back},
author = {Laurent Massoulié and Ludovic Stephan and Don Towsley},
journal= {arXiv preprint arXiv:1811.01800},
year = {2019}
}