dominant strategy∗
Henry†
2013-03-21 14:31:45
For any player i, a strategy s∗ ∈ Si weakly dominates another strategy
s ∈ Si if:
∀s−i ∈ S−i [ui (s∗ , s−i ) ≥ ui (s0 , s−i )]
0
(Remember that S−i represents the product of all strategy sets other than
i’s)
s∗ strongly dominates s0 if:
∀s−i ∈ S−i [ui (s∗ , s−i ) > ui (s0 , s−i )]
∗ hDominantStrategyi created: h2013-03-21i by: hHenryi version: h33196i Privacy setting:
h1i hDefinitioni h91A10i
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