What Semivalues Cannot See: The Information Content of Anonymous Marginal Values

Abstract

The semivalue family shares a common kernel: games invisible to every anonymous marginal value at once, nonzero from four players (Kleinberg and Weiss, 1985; Amer, Derks and Giménez, 2003). Crisman and Orrison (2015) ask what useful structure this kernel carries; this paper gives a concrete answer. In Harsanyi-dividend coordinates the joint information of all semivalues is exactly each player's total synergy at each coalition size, so the kernel is synergy arranged in closed circuits. We prove: order- d mixed-difference audits recover exactly the degree- d dividend-slice harmonics, with closed-form dimension at every rung; nonzero blind games fail superadditivity, monotonicity, and core existence, yet distinct convex games with identical values under every semivalue exist from four players, with exact perturbation thresholds; the positive weighted Shapley family attains full information 2n-1, so anonymity is the binding axiom within the marginal framework; and a coalition of size c defeats every audit of order d precisely when c2d+2, within the convex class for small perturbations. An exhaustive census at n=5 exhibits non-isomorphic voting rules with identical values under every semivalue power index; no weighted game participates in any collision, prompting a swing-rigidity conjecture. Measured against the theory, classical cooperative games sit at 0.90 to 1.00 visibility to the family versus 0.089 for a random game.

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