Borel lemma: geometric progression and zeta-functions

Abstract

In the proof of the classical Borel lemma eB by Hayman wkH, each continuous increasing function T(r)≥1 satisfies T(r+1T(r))<2T(r) outside a possible exceptional set of linear measure 2. We note in this work T(r) satisfies a sharper inequality T(r+1T(r))<(T(r)+1)2≤2T(r), if T(r)≥(2+1)2, outside a possible exceptional set of linear measure ζ(2,2+1)≤0.52<2 for the Hurwitz zeta-function ζ(s,a). This result is worth noting, provided the set of r in which 1≤ T(r)<(2+1)2 has linear measure less than 1.48. Focusing exclusively on meromorphic functions of infinite order, we utilize Hinkkanen's Second Main Theorem aH, draw comparisons with Borel eB, Nevanlinna rN, and Hayman wkH, and finally generalize Fern\'andez \'Arias aFA1.