Modular Forms and Numerical Explorations of Rational Approximations to ζ(3)

Abstract

We revisit Beukers' modular-form proof of the irrationality of ζ(3) from the point of view of the auxiliary weight two modular form. For the Fricke group 0(6), we show that Beukers' choice is not isolated: it belongs to a one-parameter affine family. These approximations have the same exponential decay as the classical Ap\'ery approximations and satisfy the same denominator-growth estimate needed in Beukers' irrationality argument. We then apply the same construction to several other genus-zero Fricke groups.