Heuer / Leopold-Wildburger Silverman’s Game

1. Introduction.- Survey of prior work.- The payoff function and expected payoffs.- The sequences {pk} and {vk}.- The sequences {Vk} and {Uk}.- Equivalent variations.- 2. Silverman’s game on intervals: preliminaries.- The key mixed strategies.- 3. Intervals with equal left endpoints or equal right endpoints.- The regions LAn, and equal right endpoints.- Case 1. [(1, B)] × [(1, B)].- Case 2. [(1, B)] × [(1, D)],1 < B < D.- Case 3. [(1, B)] × [(A, B)], 1 < A < B.- 4. Intervals with no common endpoints.- Case 4. [(1, B)] × [(A, D)], 1 < A < B < D.- Case 5. [(1, D)] × [(A, B)], 1 < A < B < D.- Case 6. [(1, B)] × [(A, D)], 1 < B ? A < D.- Appendix. Multisimilar distributions.- 5. Reduction by dominance.- Type A dominance.- Type B dominance.- Type C dominance.- Type D dominance.- Semi-reduced games.- 6. The further reduction of semi-reduced games.- Games with |M| = 1. (Reduction to 2 × 2.).- Games with M = 0 which reduce to odd order.- Games with M = 0 which reduce to even order.- 7. The symmetric discrete game.- The symmetric game with v ? 1.- The symmetric game with v < v(n).- 8. The disjoint discrete game.- The disjoint game with v ? 1.- The disjoint game with v < 1.- 9. Irreducibility and solutions of the odd-order reduced games.- The reduced game matrix A and the associated matrix B.- The polynomial sequences.- The odd-order game of type (i).- The odd-order game of type (ii).- The odd-order game of type (iii).- The odd-order game of type (iv).- 10. Irreducibility and solutions of the even-order reduced games.- The reduced game matrix A and the associated matrix B.- Further polynomial identities.- The even-order game of type (i).- The even-order games of types (ii) and (iii).- The even-order game of type (iv).- 11. Explicit solutions.- The game onintervals.- The symmetric discrete game.- The disjoint discrete game.- The reduced discrete game.- Semi-reduced balanced discrete games with no changes of sign on the diagonal.- Maximally eccentric games.- References.