On the flint hills series

Abstract

In this note, we study the flint hills series of the form align Σ n=1∞1(2n) n3 align via a certain method. The method essentially works by erecting certain pillars sufficiently close to the terms in the series and evaluating the series at those spots. This allows us to relate the convergence and the divergence of the series to other series that are somewhat tractable. In particular, we show that the convergence of the flint hill series relies very heavily on the condition that for any small ε>0 align |Σ i=0n+12Σ j=0i(-1)i-jn2i+1 ij|2s ≤ |(2n)|n2s+2-ε align for some s∈ N.