# Infinite-Duration Bidding Games

**Authors:** Guy Avni, Thomas A. Henzinger, Ventsislav Chonev

arXiv: 1705.01433 · 2019-06-10

## TL;DR

This paper introduces and analyzes infinite-duration bidding games on graphs, establishing the existence of threshold budgets for winning strategies in parity and mean-payoff games, with explicit strategies provided.

## Contribution

It is the first to study bidding mode in infinite-duration games, extending the concept of threshold budgets to parity and mean-payoff games and providing explicit optimal strategies.

## Key findings

- Threshold budgets exist for parity and mean-payoff games.
- Explicit optimal strategies are constructed for both players.
- Connection with random-turn games is extended to infinite-duration settings.

## Abstract

Two-player games on graphs are widely studied in formal methods as they model the interaction between a system and its environment. The game is played by moving a token throughout a graph to produce an infinite path. There are several common modes to determine how the players move the token through the graph; e.g., in turn-based games the players alternate turns in moving the token. We study the {\em bidding} mode of moving the token, which, to the best of our knowledge, has never been studied in infinite-duration games. The following bidding rule was previously defined and called Richman bidding. Both players have separate {\em budgets}, which sum up to $1$. In each turn, a bidding takes place: Both players submit bids simultaneously, where a bid is legal if it does not exceed the available budget, and the higher bidder pays his bid to the other player and moves the token. The central question studied in bidding games is a necessary and sufficient initial budget for winning the game: a {\em threshold} budget in a vertex is a value $t \in [0,1]$ such that if Player $1$'s budget exceeds $t$, he can win the game, and if Player $2$'s budget exceeds $1-t$, he can win the game. Threshold budgets were previously shown to exist in every vertex of a reachability game, which have an interesting connection with {\em random-turn} games -- a sub-class of simple stochastic games in which the player who moves is chosen randomly. We show the existence of threshold budgets for a qualitative class of infinite-duration games, namely parity games, and a quantitative class, namely mean-payoff games. The key component of the proof is a quantitative solution to strongly-connected mean-payoff bidding games in which we extend the connection with random-turn games to these games, and construct explicit optimal strategies for both players.

## Full text

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## Figures

9 figures with captions in the complete paper: https://tomesphere.com/paper/1705.01433/full.md

## References

50 references — full list in the complete paper: https://tomesphere.com/paper/1705.01433/full.md

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Source: https://tomesphere.com/paper/1705.01433