A generalization of comparative probability on finite sets

If \(\left(X_{k}\right)_{k=1}^{x}\) is a sequence of independent random variables with probabilities of atoms bounded away from one and \(E\) is a Borel linear subspace of \(\mathbb{R}^{x}\), then the event \(\left\{\left(X_{k}\right)_{k=1}^{X} \in E\right\}\) is a.s. equivalent to the event \(\left

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We study value sets of polynomials over a finite field, and value sets associated to pairs of such polynomials. For example, we show that the value sets (counting multiplicities) of two polynomials of degree at most d are identical or have at most q!(q!1)/d values in common where q is the number of