Relaxed update and partition network games
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Publication date
2001-06-01
Authors
Bodlaender, H.L.
Dinneen, M.J.
Khoussainov, B.
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Document Type
Preprint
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Abstract
In this paper, we study the complexity of deciding which player has a
winning strategy in certain types of McNaughton games. These graph games
can be used as models for computational problems and processes of infinite
duration. We consider the cases (1) where the first player wins when vertices
in a specified set are visited infinitely often and vertices in another specified
set are visited finitely often, (2) where the first player wins when exactly
those vertices in one of a number of specified disjoint sets are visited infinitely
often, and (3) a generalization of these first two cases. We give polynomial
time algorithms to determine which player has a winning strategy in each
of the games considered.
Keywords
graph and network algorithms, complexity, infinite graph games, McNaughton games