Determination of f(∞) from the Asymptotic Series for f(x) About x=0

Abstract

A difficult and long-standing problem in mathematical physics concerns the determination of the value of f(∞) from the asymptotic series for f(x) about x\!=\!0. In the past the approach has been to convert the asymptotic series to a sequence of Pad\'e approximants \Pnn(x)\ and then to evaluate these approximants at x\!=\!∞. Unfortunately, for most physical applications the sequence \Pnn(∞)\ is slowly converging and does not usually give very accurate results. In this paper we report the results of extensive numerical studies for a large class of functions f(x) associated with strong-coupling lattice approximations. We conjecture that for large n, Pnn(∞)\!\!f(∞)+B/ n . A numerical fit to this asymptotic behavior gives an accurate extrapolation to the value of f(∞ ).

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