Experimental Evaluation of Euler Sums

Abstract: CONTENTS 1. Introduction 2. Numerical Techniques 3. Experimental Setup and Optimizations 4. Integer Relation Detection Algorithms 5. Applications of the PSLQ Algorithm 6. Experimental Results 7. Conjectures Acknowledgments References Borwein was supported by NSERC and the Shrum Endowment at Simon Fraser University. Girgensohn was supported by a DFG fellowship. Euler expressed certain sums of the form 1 X k=1 1 + 1 2 m + + 1 k m (k + 1) ;n , where m and n are positive integers, in terms of the Riemann zeta func… Show more

“…[David Bailey] then computed this constant to 100 decimal digits, and the above equality was still affirmed." Many formulas similar to (43) have subsequently been established by rigorous proof [50].…”

Application of the combined nonlinear-condensation transformation to problems in statistical analysis and theoretical physics

“…[David Bailey] then computed this constant to 100 decimal digits, and the above equality was still affirmed." Many formulas similar to (43) have subsequently been established by rigorous proof [50].…”

Application of the combined nonlinear-condensation transformation to problems in statistical analysis and theoretical physics

“…(x,3>):=f(l-u)'-V~1<fM = r^r^ for x>0,. In this paper, we will consider s h (2, m), leaving discussion of the more general s b (n, m) for [1]. The purpose of this paper is to give a complete proof of the formulas This last evaluation is due to Euler (cf.…”

Explicit evaluation of Euler sums

“…The multiple zeta sums: [3], Borwein et al [4], Borwein et al [7], Broadhurst et al [9], Crandall and Buhler [11], Markett [13] and Zagier [14]) (note that some previous treatments have reversed ordering of the indices n i ). The study of such sums is not only important to general zeta function theory, but also touches upon such domains as knot theory and particle physics methodology.…”

“…(where n denotes the the number of (3, 1) pairs) remain elusive. * Even the twodimensional sums ζ(6, 2) and ζ (3,5) are unknown, in the sense that neither has been cast in a finite form involving "one-dimensional" sums such as Riemann zeta values. There is a growing literature on which sums are evaluable, which can be reduced to lower-dimensional forms, and which appear dimensionally irreducible and therefore "fundamental."…”

“…The requirement of high precision arises for various reasons, such as the desire to avoid "accidental" relations and to guard against mishap when some integral coefficients of exact relations are large. The original approach of Bailey et al [3] involved an Euler-Maclaurin scheme for estimating double sums. This approach has been effectively generalized by Broadhurst, as described in [7], to higher dimensions.…”

Fast evaluation of multiple zeta sums