On the enumeration of irreducible k-fold Euler sums and their roles in knot theory and field theory

Abstract

A generating function is given for the number, E(l,k), of irreducible k-fold Euler sums, with all possible alternations of sign, and exponents summing to l. Its form is remarkably simple: Σn E(k+2n,k) xn = Σd|kμ(d) (1-xd)-k/d/k, where μ is the M\"obius function. Equivalently, the size of the search space in which k-fold Euler sums of level l are reducible to rational linear combinations of irreducible basis terms is S(l,k) = Σn<k(l+n-1)/2 n. Analytical methods, using Tony Hearn's REDUCE, achieve this reduction for the 3698 convergent double Euler sums with l≤44; numerical methods, using David Bailey's MPPSLQ, achieve it for the 1457 convergent k-fold sums with l≤7; combined methods yield bases for all remaining search spaces with S(l,k)≤34. These findings confirm expectations based on Dirk Kreimer's connection of knot theory with quantum field theory. The occurrence in perturbative quantum electrodynamics of all 12 irreducible Euler sums with l≤ 7 is demonstrated. It is suggested that no further transcendental occurs in the four-loop contributions to the electron's magnetic moment. Irreducible Euler sums are found to occur in explicit analytical results, for counterterms with up to 13 loops, yielding transcendental knot-numbers, up to 23 crossings.

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