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Let Formula: see text denote the Kubota–Leopoldt Formula: see text-adic zeta function. We prove that, for every nonnegative integer Formula: see text, there exists an odd integer Formula: see text in the interval Formula: see text such that Formula: see text is irrational. In particular, at least one of Formula: see text is irrational. Our approach is inspired by the recent work of Sprang. We construct explicit rational functions. The Volkenborn integrals of these rational functions’ (higher-order) derivatives produce good linear combinations of Formula: see text and Formula: see text-adic Hurwitz zeta values. The most difficult step is proving that certain Volkenborn integrals are nonzero, which is resolved by carefully manipulating the binomial coefficients.
Li Lai (Wed,) studied this question.