Predictions under common knowledge of payoffs may differ from those under arbitrarily,
but finitely, many orders of mutual knowledge; Rubinstein's (1989) Email game
is a seminal example. Weinstein and Yildiz (2007) showed that the discontinuity in
the example generalizes: for all types with multiple rationalizable (ICR) actions, there
exist similar types with unique rationalizable action. This paper studies how a wide
class of departures from common belief in rationality impact Weinstein and ...
Predictions under common knowledge of payoffs may differ from those under arbitrarily,
but finitely, many orders of mutual knowledge; Rubinstein's (1989) Email game
is a seminal example. Weinstein and Yildiz (2007) showed that the discontinuity in
the example generalizes: for all types with multiple rationalizable (ICR) actions, there
exist similar types with unique rationalizable action. This paper studies how a wide
class of departures from common belief in rationality impact Weinstein and Yildiz's
discontinuity. We weaken ICR to ICR-x, where x is a sequence whose n-th term is the
probability players attach to (n - 1)th-order belief in rationality. We find that Weinstein
and Yildiz's discontinuity holds when higher-order belief in rationality remains
above some threshold (constant x), but fails when higher-order belief in rationality
eventually becomes low enough (x converging to 0).
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