On some conjectures of Samuels and Feige
Abstract
Let μ1 …c μn > 0 and μ1 + …m + μn = 1. Let X1, …c, Xn be independent non-negative random variables with EX1 = …c = EXn = 1, and let Z = Σi=1n μi Xi. Let M = 1 i n μi = μ1, and let δ > 0 and T = 1 + δ. Both Samuels and Feige formulated conjectures bounding the probability P(Z < T) from above. We prove that Samuels' conjecture implies a conjecture of Feige.
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