Gaps of powers of consecutive primes and some consequences
Abstract
Let pn denote the n-th prime number, \qn\ be a sequence of positive numbers and x∈R. In this note we prove that the inequality qn pn+1x-qn+1pnx<pnxpn+1x-1, holds for infinitely many values of n. As it is shown, the key ingredient to obtain this behaviour is a consequence of an extension of the Kummer's characterization of convergent series of positive terms.
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