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The inequality of Milne and its converseKeywords: Milne's inequality , Inequalities for sums , Matrix inequalities Abstract: We prove: Let be real numbers with . Then we have for all real numbers : with the best possible exponents and . The left-hand side of (0.1) with is a discrete version of an integral inequality due to E.A. Milne [1]. Moreover, we present a matrix analogue of (0.1).
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