2019
DOI: 10.1007/978-3-030-35389-6_16
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The Classes PPA-k: Existence from Arguments Modulo k

Abstract: The complexity classes PPA-k, k ≥ 2, have recently emerged as the main candidates for capturing the complexity of important problems in fair division, in particular Alon's Necklace-Splitting problem with k thieves. Indeed, the problem with two thieves has been shown complete for PPA = PPA-2. In this work, we present structural results which provide a solid foundation for the further study of these classes. Namely, we investigate the classes PPA-k in terms of (i) equivalent definitions, (ii) inner structure, (i… Show more

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Cited by 6 publications
(15 citation statements)
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“…Computational Classes: As mentioned earlier, among the classes of TFNP, PPAD has been the most successful in capturing the complexity of well-known problems. Besides the complexity of computing a Nash equilibrium [Daskalakis et al, 2009, Chen et al, 2009b, Rubinstein, 2018, other PPAD-complete problems are computing equilibria in markets [Chen et al, 2009a[Chen et al, , 2013, versions of envy-free cake cutting [Deng et al, 2012] and fixed-point theorems [Mehta, 2014, Goldberg andHollender, 2019].…”
Section: Discussion and Further Related Workmentioning
confidence: 99%
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“…Computational Classes: As mentioned earlier, among the classes of TFNP, PPAD has been the most successful in capturing the complexity of well-known problems. Besides the complexity of computing a Nash equilibrium [Daskalakis et al, 2009, Chen et al, 2009b, Rubinstein, 2018, other PPAD-complete problems are computing equilibria in markets [Chen et al, 2009a[Chen et al, , 2013, versions of envy-free cake cutting [Deng et al, 2012] and fixed-point theorems [Mehta, 2014, Goldberg andHollender, 2019].…”
Section: Discussion and Further Related Workmentioning
confidence: 99%
“…Recently, Göös et al [2019] showed that an explicit version of the problem is complete for PPA-p, therefore obtaining the first PPA-p-completeness result for a natural problem. The authors of [Göös et al, 2019], as well as Hollender [2019], independently also extended the definition of the classes PPA-k to any k ≥ 2, and provided several characterizations in terms of their defined-for-primes counterparts. Hollender [2019] also investigated the connection with the classes PMOD-k, which bear strong resemblance to PPA-k, and were defined seemingly independently of Papadimitriou's work by Johnson [2011].…”
Section: Discussion and Further Related Workmentioning
confidence: 99%
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