The Hairy Ball problem is PPAD-complete
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摘要
The Hairy Ball Theorem states that every continuous tangent vector field on an even-dimensional sphere must have a zero. We prove that the associated computational problem of (a) computing an approximate zero is PPAD-complete, and (b) computing an exact zero is FIXP-hard. We also consider the Hairy Ball Theorem on toroidal instead of spherical domains and show that the approximate problem remains PPAD-complete. On a conceptual level, our PPAD-membership results are particularly interesting, because they heavily rely on the investigation of multiple-source variants of End-of-Line, the canonical PPAD-complete problem. Our results on these new End-of-Line variants are of independent interest and provide new tools for showing membership in PPAD. In particular, we use them to provide the first full proof of PPAD-completeness for the Imbalance problem defined by Beame et al. in 1998.
论文关键词:Computational complexity,TFNP,PPAD,End-of-Line
论文评审过程:Received 30 October 2019, Revised 29 September 2020, Accepted 26 May 2021, Available online 9 June 2021, Version of Record 16 June 2021.
论文官网地址:https://doi.org/10.1016/j.jcss.2021.05.004