Exact Solution for Optimal Navigation with Total Cost Restriction

Abstract

Recently, Li et al. have concentrated on Kleinberg's navigation model with a certain total length constraint = cN, where N is the number of total nodes and c is a constant. Their simulation results for the 1- and 2-dimensional cases indicate that the optimal choice for adding extra long-range connections between any two sites seems to be α=d+1, where d is the dimension of the lattice and α is the power-law exponent. In this paper, we prove analytically that for the 1-dimensional large networks, the optimal power-law exponent is α=2 Further, we study the impact of the network size and provide exact solutions for time cost as a function of the power-law exponent α. We also show that our analytical results are in excellent agreement with simulations.