Logical Methods in Computer Science (Jan 2022)

A Recursive Approach to Solving Parity Games in Quasipolynomial Time

  • Karoliina Lehtinen,
  • Paweł Parys,
  • Sven Schewe,
  • Dominik Wojtczak

DOI
https://doi.org/10.46298/lmcs-18(1:8)2022
Journal volume & issue
Vol. Volume 18, Issue 1

Abstract

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Zielonka's classic recursive algorithm for solving parity games is perhaps the simplest among the many existing parity game algorithms. However, its complexity is exponential, while currently the state-of-the-art algorithms have quasipolynomial complexity. Here, we present a modification of Zielonka's classic algorithm that brings its complexity down to $n^{O\left(\log\left(1+\frac{d}{\log n}\right)\right)}$, for parity games of size $n$ with $d$ priorities, in line with previous quasipolynomial-time solutions.

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