Some properties of the pseudo-Smarandache function
Abstract
We answer a number of questions relating to the pseudo-Smarandache function Z(n). We show that the ratio of consecutive values Z(n+1)/Z(n) and Z(n-1)/Z(n) are unbounded; that Z(2n)/Z(n) is unbounded; that n/Z(n) takes every integer value infinitely often; and that the series Σn 1/Z(n)α is convergent for any α > 1.
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