Lower bound on the size of a quasirandom forcing set of permutations

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Authors	KUREČKA Martin
Year of publication	2022
Type	Article in Periodical
Magazine / Source	COMBINATORICS PROBABILITY & COMPUTING
MU Faculty or unit	Faculty of Informatics
Citation
Web	http://dx.doi.org/10.1017/S0963548321000298
Doi	http://dx.doi.org/10.1017/S0963548321000298
Keywords	quasirandomness; quasirandom permutations; combinatorial limits; quasirandomness forcing
Description	A set S of permutations is forcing if for any sequence {Pi_i} of permutations where the density d(pi, Pi_i) converges to 1/\|pi\|! for every permutation pi from S, it holds that {Pi_i} is quasirandom. Graham asked whether there exists an integer k such that the set of all permutations of order k is forcing; this has been shown to be true for any k>=4 . In particular, the set of all 24 permutations of order 4 is forcing. We provide the first non-trivial lower bound on the size of a forcing set of permutations: every forcing set of permutations (with arbitrary orders) contains at least four permutations.
Related projects:	MUNI AWARD in Science and Humanitites 1 Rozsáhlé výpočetní systémy: modely, aplikace a verifikace X. Zapojení studentů Fakulty informatiky do mezinárodní vědecké komunity 21 Rozsáhlé výpočetní systémy: modely, aplikace a verifikace XI.