Connectivity Threshold of Random Geometric Graphs with Cantor Distributed Vertices

Abstract

For connectivity of random geometric graphs, where there is no density for underlying distribution of the vertices, we consider n i.i.d. Cantor distributed points on [0,1]. We show that for this random geometric graph, the connectivity threshold Rn, converges almost surely to a constant 1-2φ where 0 < φ < 1/2, which for the standard Cantor distribution is 1/3. We also show that \| Rn - (1 - 2 φ) \|1 2 \, C(φ) \, n-1/dφ where C(φ) > 0 is a constant and dφ := - 2/ φ is the Hausdorff dimension of the generalized Cantor set with parameter φ.