The k-visibility Localization Game

Abstract

We study a variant of the Localization game in which the cops have limited visibility, along with the corresponding optimization parameter, the k-visibility localization number ζk, where k is a non-negative integer. We give bounds on k-visibility localization numbers related to domination, maximum degree, and isoperimetric inequalities. For all k, we give a family of trees with unbounded ζk values. Extending results known for the localization number, we show that for k≥ 2, every tree contains a subdivision with ζk = 1. For many n, we give the exact value of ζk for the n × n Cartesian grid graphs, with the remaining cases being one of two values as long as n is sufficiently large. These examples also illustrate that ζi ≠ ζj for all distinct choices of i and j.

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