Numerical Computation of Πn=1∞ (1 - txn)

Abstract

I present and analyze a quadratically convergent algorithm for computing the infinite product Πn=1∞ (1 - txn) for arbitrary complex t and x satisfying |x| < 1, based on the identity Πn=1∞ (1 - txn) = Σm=0∞ (-t)m xm(m+1)/2 (1-x)(1-x2) ... (1-xm) due to Euler. The efficiency of the algorithm deteriorates as |x| 1, but much more slowly than in previous algorithms. The key lemma is a two-sided bound on the Dedekind eta function at pure imaginary argument, η(iy), that is sharp at the two endpoints y=0,∞ and is accurate to within 9.1% over the entire interval 0 < y < ∞.

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