Upper tail bounds for Stars
Abstract
For r 2, let X be the number of r-armed stars K1,r in the binomial random graph Gn,p. We study the upper tail (X (1+ε) X), and establish exponential bounds which are best possible up to constant factors in the exponent (for the special case of stars K1,r this solves a problem of Janson and Rucinski, and confirms a conjecture by DeMarco and Kahn). In contrast to the widely accepted standard for the upper tail problem, we do not restrict our attention to constant ε, but also allow for ε n-α deviations.
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