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Main Authors: Cianfanelli, Leonardo, Messina, Sebastiano, Como, Giacomo, Fagnani, Fabio
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.11337
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author Cianfanelli, Leonardo
Messina, Sebastiano
Como, Giacomo
Fagnani, Fabio
author_facet Cianfanelli, Leonardo
Messina, Sebastiano
Como, Giacomo
Fagnani, Fabio
contents We study an optimal intervention problem on the linear threshold model (LTM) in which a social planner aims to design minimal-cost interventions that modify the agents' thresholds, under the constraint that at least a predefined fraction of agents reaches a given state after a finite number of iterations. While this problem is known to be NP-hard and its exact solution requires full knowledge of the network structure, we focus on approximate solutions for large-scale networks and assume that the planner has only statistical knowledge of the network. In particular, we build on a local mean-field approximation of the LTM that is known to hold true on large-scale random networks, and reformulate the optimal intervention problem as a linear program with an infinite set of constraints. We then show how to approximate the solutions of the latter problem by standard linear programs with finitely many constraints. Finally, our approach is validated through numerical experiments on real-world networks and compared both with optimal seeding and state-of-the-art algorithms for the least-cost influence.
format Preprint
id arxiv_https___arxiv_org_abs_2605_11337
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Optimal Interventions on the Linear Threshold Model in Large-Scale Networks
Cianfanelli, Leonardo
Messina, Sebastiano
Como, Giacomo
Fagnani, Fabio
Computer Science and Game Theory
We study an optimal intervention problem on the linear threshold model (LTM) in which a social planner aims to design minimal-cost interventions that modify the agents' thresholds, under the constraint that at least a predefined fraction of agents reaches a given state after a finite number of iterations. While this problem is known to be NP-hard and its exact solution requires full knowledge of the network structure, we focus on approximate solutions for large-scale networks and assume that the planner has only statistical knowledge of the network. In particular, we build on a local mean-field approximation of the LTM that is known to hold true on large-scale random networks, and reformulate the optimal intervention problem as a linear program with an infinite set of constraints. We then show how to approximate the solutions of the latter problem by standard linear programs with finitely many constraints. Finally, our approach is validated through numerical experiments on real-world networks and compared both with optimal seeding and state-of-the-art algorithms for the least-cost influence.
title Optimal Interventions on the Linear Threshold Model in Large-Scale Networks
topic Computer Science and Game Theory
url https://arxiv.org/abs/2605.11337