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Parity and Streett Games with Costs

Nathanaël Fijalkow ; Martin Zimmermann.

We consider two-player games played on finite graphs equipped with costs on edges and introduce two winning conditions, cost-parity and cost-Streett, which require bounds on the cost between requests and their responses. Both conditions generalize the corresponding classical omega-regular conditions&nbsp;[&hellip;]

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How Much Lookahead is Needed to Win Infinite Games?

Felix Klein ; Martin Zimmermann.

Delay games are two-player games of infinite duration in which one player may delay her moves to obtain a lookahead on her opponent's moves. For $\omega$-regular winning conditions it is known that such games can be solved in doubly-exponential time and that doubly-exponential lookahead is&nbsp;[&hellip;]

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Easy to Win, Hard to Master: Optimal Strategies in Parity Games with Costs

Alexander Weinert ; Martin Zimmermann.

The winning condition of a parity game with costs requires an arbitrary, but fixed bound on the cost incurred between occurrences of odd colors and the next occurrence of a larger even one. Such games quantitatively extend parity games while retaining most of their attractive properties, i.e,&nbsp;[&hellip;]

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