Absorbing games with irrational values
Abstract
Can an absorbing game with rational data have an irrational limit value? Yes: In this note we provide the simplest examples where this phenomenon arises. That is, the following 3× 3 absorbing game \[ A = bmatrix 1* & 1* & 2* \\ 1* & 2* & 0* \\ 2* & 0* & 1* bmatrix, \] and a sequence of 2× 2 absorbing games whose limit values are k, for all integer k. Finally, we conjecture that any algebraic number can be represented as the limit value of an absorbing game.
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