A Tight Lower Bound for 3-Coloring Grids in the Online-LOCAL Model
Abstract
Recently, *akbari2021locality~(ICALP 2023) studied the locality of graph problems in distributed, sequential, dynamic, and online settings from a unified point of view. They designed a novel O( n)-locality deterministic algorithm for proper 3-coloring bipartite graphs in the Online-LOCAL model. In this work, we establish the optimality of the algorithm by showing a tight deterministic ( n) locality lower bound, which holds even on grids. To complement this result, we have the following additional results: enumerate We show a higher and tight (n) lower bound for 3-coloring toroidal and cylindrical grids. Considering the generalization of 3-coloring bipartite graphs to (k+1)-coloring k-partite graphs, %where k ≥ 2 is a constant, we show that the problem also has O( n) locality when the input is a k-partite graph that admits a locally inferable unique coloring. This special class of k-partite graphs covers several fundamental graph classes such as k-trees and triangular grids. Moreover, for this special class of graphs, we show a tight ( n) locality lower bound. For general k-partite graphs with k ≥ 3, we prove that the problem of (2k-2)-coloring k-partite graphs exhibits a locality of (n) in the model, matching the round complexity of the same problem in the model recently shown by *coiteux2023no~(STOC 2024). Consequently, the problem of (k+1)-coloring k-partite graphs admits a locality lower bound of (n) when k≥ 3, contrasting sharply with the ( n) locality for the case of k=2. enumerate
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