Exact & Numerical Tests of Generalised Root Identities for non-integer μ

Abstract

We consider the generalised root identities introduced in [1] for simple functions, and also for (z+1) and ζ(s). In this paper, unlike [1], we focus on the case of noninteger μ. For the simplest function f(z)=z, and hence for arbitrary polynomials, we show that they are satisfied for arbitrary real μ (and hence for arbitrary complex μ by analytic continuation). Using this, we then develop an asymptotic formula for the derivative side of the root identities for (z+1) at arbitrary real μ, from which we are able to demonstrate numerically that (z+1) also satisfies the generalised root identities for arbitrary μ, not just integer values. Finally we examine the generalised root identites for ζ also for non-integer values of μ. Having shown in [1] that ζ satisfies these identities exactly for integer μ>1 (and also for μ=1 after removal of an obstruction), in this paper we present strong numerical evidence first that ζ satisfies them for arbitrary μ>1 where the root side is classically convergent, and then that this continues to be true also for -1<μ<1 where C\'esaro divergences must be removed and C\'esaro averaging of the residual partial-sum functions is required (when μ<0). Careful consideration of a neighbourhood of μ=0 also sheds light on the appearance of the 2d ln-divergence that was handled heuristically in [1] and why the assignment of 2d C\'esaro limit 0 to this in [1] is justified. The numerical calculations for μ>0 are bundled in portable R-code; the code for the case -1<μ<0, including the C\'esaro averaging required when μ<0, is in VBA. Both the R-scripts and XL spreadsheet are made available with this paper, along with supporting files, and can be readily used to further verify these claims.