A note on the binomial distribution motivated by Chv\'atal's theorem and Tomasewski's theorem
Abstract
Let B(n,p) denote a binomial random variable with parameters n and p. Chv\'atal's theorem says that for any fixed n≥ 2, as m ranges over \0,1,…,n\, the probability qm:=P(B(n,m/n)≤ m) is the smallest when m is closest to 2n/3. Let R be the family of random variables of the form X=Σnk=1akk, where n 1, ak, k=1, …, n, are real numbers with Σnk=1 ak2=1, and k, k=1, 2, …, are independent Rademacher random variables (i.e., P(k=1)=P(k=-1)=1/2). Tomaszewski's theorem says that ∈fX∈ RP(|X|≤ 1)=1/2. Motivated by Chv\'atal's Theorem and Tomasewski's Theorem, in this note, we study the minimum value of the probability fn(k):=P(|B(n,k/n)-k|≤ Var (B(n,k/n))) when k ranges over \0,1,…,n\ for any fixed n≥ 1, where Var (·) denotes the variance, and prove that it is the smallest when k=1 and n-1.
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