Asymptotic analysis of Skolem's exponential functions

Abstract

Skolem (1956) studied the germs at infinity of the smallest class of real valued functions on the positive real line containing the constant 1, the identity function x, and such that whenever f and g are in the set, f+g,fg and fg are in the set. This set of germs is well ordered and Skolem conjectured that its order type is epsilon-zero. Van den Dries and Levitz (1984) computed the order type of the fragment below 22x. Here we prove that the set of asymptotic classes within any archimedean class of Skolem functions has order type ω. As a consequence we obtain, for each positive integer n, an upper bound for the fragment below 2nx. We deduce an epsilon-zero upper bound for the fragment below 2xx, improving the previous epsilon-omega bound by Levitz (1978). A novel feature of our approach is the use of Conway's surreal number for asymptotic calculations.