English

Phase Transition in the Maximal Influence Problem: When Do We Need Optimization?

Social and Information Networks 2018-11-13 v2 Statistical Mechanics Data Structures and Algorithms Data Analysis, Statistics and Probability Physics and Society

Abstract

Considerable efforts were made in recent years in devising optimization algorithms for influence maximization in networks. Here we ask: "When do we need optimization?" We use results from statistical mechanics and direct simulations on ER networks, small-world networks, power-law networks and a dataset of real-world networks to characterize the parameter-space region where optimization is required. We show that in both synthetic and real-world networks this optimization region is due to a well known physical phase transition of the network, and that it vanishes as a power-law with the network size. We then show that also from a utility-maximization perspective (when considering the costs of the optimization process), for large networks standard optimization is profitable only in a vanishing parameter region near the phase transition. Finally, we introduce a novel constant-time optimization approach, and demonstrate it through a simple algorithm that manages to give similar results to standard optimization methods in terms of the influenced-set size, while improving the results in terms of the net utility.

Keywords

Cite

@article{arxiv.1708.02142,
  title  = {Phase Transition in the Maximal Influence Problem: When Do We Need Optimization?},
  author = {Yoav Kolumbus and Sorin Solomon},
  journal= {arXiv preprint arXiv:1708.02142},
  year   = {2018}
}
R2 v1 2026-06-22T21:08:40.647Z