Abstract
We introduce and physically motivate the following problem in geometric combinatorics, originally inspired by analysing Bell inequalities. A grasshopper lands at a random point on a planar lawn of area 1. It then jumps once, a fixed distance d, in a random direction. What shape should the lawn be to maximize the chance that the grasshopper remains on the lawn after jumping? We show that, perhaps surprisingly, a disc-shaped lawn is not optimal for any d > 0. We investigate further by introducing a spin model whose ground state corresponds to the solution of a discrete version of the grasshopper problem. Simulated annealing and parallel tempering searches are consistent with the hypothesis that, for d
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Goulko, O., & Kent, A. (2017). The grasshopper problem. In Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences (Vol. 473). Royal Society Publishing. https://doi.org/10.1098/rspa.2017.0494
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