• Graduate Programs
    • Tinbergen Institute Research Master in Economics
      • Why Tinbergen Institute?
      • Research Master
      • Admissions
      • Course Registration
      • PhD Vacancies
      • Selected PhD Placements
    • Facilities
    • Browse our Courses
    • Research Master Business Data Science
    • PhD Vacancies
  • Research
  • Browse our Courses
  • Events
    • Summer School
      • Applied Public Policy Evaluation
      • Deep Learning
      • Economics of Blockchain and Digital Currencies
      • Economics of Climate Change
      • Foundations of Machine Learning with Applications in Python
      • From Preference to Choice: The Economic Theory of Decision-Making
      • Gender in Society
      • Machine Learning for Business
      • Marketing Research with Purpose
      • Sustainable Finance
      • Tuition Fees and Payment
      • Business Data Science Summer School Program
    • Events Calendar
    • Events Archive
    • Tinbergen Institute Lectures
    • 16th Tinbergen Institute Annual Conference
    • Annual Tinbergen Institute Conference
  • News
  • Job Market Candidates
  • Alumni
    • PhD Theses
    • Master Theses
    • Selected PhD Placements
    • Key alumni publications
    • Alumni Community
Home | Events | Values for Global Cooperative Games
Seminar

Values for Global Cooperative Games

  • Location
    Tinbergen Institute, room 1.24 (Shanghai)
    Amsterdam
  • Date and time

    November 18, 2025
    16:00 - 17:15

Abstract

A global (cooperative) game describes the utility that the whole set of players generates depending on the coalition structure they form. These games were introduced by Gilboa and Lehrer (1991) who proposed and characterized a generalization of the Shapley value. We investigate the implications of weakening the symmetry property of their characterization and obtain the class of all linear, efficient, and anonymous values that also satisfy the null player property. Finally, we present and characterize the Lattice Structure Value, which is an alternative extension of the Shapley value to this setting. Joint paper with J.M. Alonso-Meijide, M.G. Fiestras-Janeiro, and A. Jimenez-Losada.