TY - JOUR
T1 - A priori data-driven robustness guarantees on strategic deviations from generalised Nash equilibria
AU - Pantazis, Georgios
AU - Fele, Filiberto
AU - Margellos, Kostas
PY - 2024
Y1 - 2024
N2 - In this paper we focus on noncooperative games with uncertain constraints coupling the agents’ decisions. We consider a setting where bounded deviations of agents’ decisions from the equilibrium are possible, and uncertain constraints are inferred from data. Building upon recent advances in the so called scenario approach, we propose a randomised algorithm that returns a nominal equilibrium such that a pre-specified bound on the probability of violation for yet unseen constraints is satisfied for an entire region of admissible deviations surrounding it—thus supporting neighbourhoods of equilibria with probabilistic feasibility certificates. For the case in which the game admits a potential function, whose minimum coincides with the social welfare optimum of the population, the proposed algorithmic scheme opens the road to achieve a trade-off between the guaranteed feasibility levels of the region surrounding the nominal equilibrium, and its system-level efficiency. Detailed numerical simulations corroborate our theoretical results.
AB - In this paper we focus on noncooperative games with uncertain constraints coupling the agents’ decisions. We consider a setting where bounded deviations of agents’ decisions from the equilibrium are possible, and uncertain constraints are inferred from data. Building upon recent advances in the so called scenario approach, we propose a randomised algorithm that returns a nominal equilibrium such that a pre-specified bound on the probability of violation for yet unseen constraints is satisfied for an entire region of admissible deviations surrounding it—thus supporting neighbourhoods of equilibria with probabilistic feasibility certificates. For the case in which the game admits a potential function, whose minimum coincides with the social welfare optimum of the population, the proposed algorithmic scheme opens the road to achieve a trade-off between the guaranteed feasibility levels of the region surrounding the nominal equilibrium, and its system-level efficiency. Detailed numerical simulations corroborate our theoretical results.
KW - Generalised equilibrium problem
KW - Multi-agent systems
KW - Randomised methods
KW - Stochastic game theory
UR - http://www.scopus.com/inward/record.url?scp=85194700257&partnerID=8YFLogxK
U2 - 10.1016/j.automatica.2024.111746
DO - 10.1016/j.automatica.2024.111746
M3 - Article
AN - SCOPUS:85194700257
SN - 0005-1098
VL - 167
JO - Automatica
JF - Automatica
M1 - 111746
ER -