Power laws and power-of-two-choices
Abstract
This paper analyzes a variation on the well-known "power of two choices" allocation algorithms. Classically, the smallest of d randomly-chosen options is selected. We investigate what happens when the largest of d randomly-chosen options is selected. This process generates a power-law-like distribution: the ith-smallest value scales with id-1, where d is the number of randomly-chosen options, with high probability. We give a formula for the expectation and show the distribution is concentrated around the expectation
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