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Erdos-Littlewood-Offord problem with arbitrary probabilities

The classical Erdős-Littlewood-Offord problem concerns the random variable $X = a_1 ξ_1 + \dots + a_n ξ_n$, where $a_i \in \mathbb{R} \setminus \{0\}$ are fixed and $ξ_i \sim \text{Ber}(1/2)$ are independent. The Erdős-Littlewood-Offord theorem states that the maximum possible concentration probability $\max_{x \in \mathbb{R}} \Pr(X = x)$ is $\binom{n}{\lfloor n/2\rfloor} / 2^n$, achieved when the $a_i$ are all $1$. As proposed by Fox, Kwan, and Sauermann, we investigate the general case where $ξ_i \sim \text{Ber}(p)$ instead. Using purely combinatorial techniques, we show that the exact maximum concentration probability is achieved when $a_i \in \{-1, 1\}$ for each $i$. Then, using Fourier-analytic techniques, we investigate the optimal ratio of $1$s to $-1$s. Surprisingly, we find that in some cases, the numbers of $1$s and $-1$s can be far from equal.