Abstract
Moser and Tardos (J. ACM (JACM) 57(2), 11 2010) gave an algorithmic proof of the lopsided Lovász local lemma (LLL) in the variable framework, where each of the undesirable events is assumed to depend on a subset of a collection of independent random variables. For the proof, they define a notion of a lopsided dependency between the events suitable for this framework. In this work, we strengthen this notion, defining a novel directed notion of dependency and prove the LLL for the corresponding graph. We show that this graph can be strictly sparser (thus the sufficient condition for the LLL weaker) compared with graphs that correspond to other extant lopsided versions of dependency. Thus, in a sense, we address the problem “find other simple local conditions for the constraints (in the variable framework) that advantageously translate to some abstract lopsided condition” posed by Szegedy (2013). We also give an example where our notion of dependency graph gives better results than the classical Shearer lemma. Finally, we prove Shearer’s lemma for the dependency graph we define. For the proofs, we perform a direct probabilistic analysis that yields an exponentially small upper bound for the probability of the algorithm that searches for the desired assignment to the variables not to return a correct answer within n steps. In contrast, the method of proof that became known as the entropic method, gives an estimate of only the expectation of the number of steps until the algorithm returns a correct answer, unless the probabilities are tinkered with.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Change history
09 November 2020
A Correction to this paper has been published: https://doi.org/10.1007/s10472-020-09715-1
References
Achlioptas, D., Iliopoulos, F.: Random walks that find perfect objects and the Lovász local lemma. In: Proceedings 55th Annual Symposium on Foundations of Computer Science (FOCS), pp 494–503. IEEE (2014)
Achlioptas, D., Iliopoulos, F.: Random walks that find perfect objects and the Lovász local lemma. J. ACM (JACM) 63(3), 22 (2016)
Bender, E.A., Bruce Richmond, L: A multivariate Lagrange inversion formula for asymptotic calculations. Electron. J. Comb. 5(1), 33 (1998)
Erdős, P., Lovász, L.: Problems and results on 3-chromatic hypergraphs and some related questions. Infinite Finite Sets 10, 609–627 (1975)
Erdős, P., Spencer, J.: Lopsided Lovász local lemma and Latin transversals. Discret. Appl. Math. 30(2–3), 151–154 (1991)
Giotis, I., Kirousis, L., Psaromiligkos, K.I., Thilikos, D.M.: On the algorithmic Lovász local lemma and acyclic edge coloring. In: Proceedings of the twelfth workshop on analytic algorithmics and combinatorics. Society for Industrial and Applied Mathematics (2015) Available: http://epubs.siam.org/doi/pdf/10.1137/1.9781611973761.2
Giotis, I., Kirousis, L.M., Livieratos, J., Psaromiligkos, K.I., Thilikos, D.M.: Alternative proofs of the asymmetric Lovász local lemma and Shearer’s lemma. In: Proceedings of the 11th International Conference on Random and Exhaustive Generation of Combinatorial Structures, GASCom (2018) Available: http://ceur-ws.org/Vol-2113/paper15.pdf
Giotis, I., Kirousis, L.M., Psaromiligkos, K.I., Thilikos, D.: An alternative proof for the constructive asymmetric Lovász local lemma. In: 13th Cologne Twente Workshop on Graphs and Combinatorial Optimization (2015)
Harris, D.G.: Lopsidependency in the Moser-Tardos framework: Beyond the lopsided Lovász local lemma. In: Proceedings of the 26th Annual ACM-SIAM Symposium on Discrete Algorithms (SODA), pp. 1792–1808. SIAM (2015)
Harris, D.G, Srinivasan, A.: A constructive algorithm for the Lovász local lemma on permutations. In: Proceedings 25th Annual ACM-SIAM Symposium on Discrete Algorithms (SODA), pp. 907–925. SIAM (2014)
Harvey, N.J.A., Vondrák, J.: An algorithmic proof of the Lovász local lemma via resampling oracles. In: Proceedings 56th Annual Symposium on Foundations of Computer Science (FOCS), pp. 1327–1346. IEEE (2015)
He, K., Li, L., Liu, X., Wang, Y., Xia, M.: Variable-version Lovász local: Beyond shearer’s bound. In: 58th Annual Symposium on Foundations of Computer Science (FOCS), pp. 451–462. IEEE (2017)
Horn, R.A, Johnson, C.R: Matrix Analysis. Cambridge University Press (1990)
Kolipaka, K., Rao, B., Szegedy, M.: Moser and Tardos meet Lovász. In: Proceedings 43rd Annual ACM Symposium on Theory of Computing (STOC), pp. 235–244. ACM (2011)
Moser, R.A.: A constructive proof of the Lovász local lemma. In: Proceedings 41st Annual ACM Symposium on Theory of Computing (STOC), pp. 343–350. ACM (2009)
Moser, R.A., Tardos, G.: A constructive proof of the general Lovász local lemma. J. ACM (JACM) 57(2), 11 (2010)
Sarkar, K., Colbourn, C.J: Upper bounds on the size of covering arrays. SIAM J. Discret. Math. 31(2), 1277–1293 (2017)
Shearer, J.B.: On a problem of Spencer. Combinatorica 5(3), 241–245 (1985)
Szegedy, M.: The Lovász local lemma–a survey. In: International Computer Science Symposium in Russia, pp. 1–11. Springer (2013)
Tao, T.: Moser’s entropy compression argument (2009) Available: https://terrytao.wordpress.com/2009/08/05/mosers-entropy-compression-argument/
Author information
Authors and Affiliations
Corresponding author
Additional information
Publisher’s note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
L. Kirousis research was partially supported by TIN2017-86727-C2-1-R, GRAMM. K. Psaromiligkos research was carried out while an undergraduate student at the Department of Mathematics of the National and Kapodistrian University of Athens.
Rights and permissions
About this article
Cite this article
Kirousis, L., Livieratos, J. & Psaromiligkos, K.I. Directed Lovász local lemma and Shearer’s lemma. Ann Math Artif Intell 88, 133–155 (2020). https://doi.org/10.1007/s10472-019-09671-5
Published:
Issue Date:
DOI: https://doi.org/10.1007/s10472-019-09671-5