## 32-digit values of the first 100 recurrence coefficients relative to the weight function w(x)=x^{-1/2}(1-x)^{-1/2}log(1/x) on (0,1) computed by the SOPQ routine sr_jacobilog1(100,-1/2,-1/2,32)

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Purdue University

32-digit values of the first 100 recurrence coefficients relative to the weight function w(x)=x^{-1/2}(1-x)^{-1/2}log(1/x) on (0,1) computed by the SOPQ routine sr_jacobilog1(100,-1/2,-1/2,32)

Version 1.0 - published on 22 Apr 2014 doi:10.4231/R70Z715M - cite this Archived on 25 Oct 2016

 The first 100 recurrence coefficients for the weight function w(x)=x^{-1/2}(1-x)^{-1/2}log(1/x) on (0,1) are obtained to 32 decimal digits from the first 200 modified moments by using Chebyshev&#39;s algorithm in sufficiently high precision; cf. Sec.3 of &quot;Gauss quadrature routines for two classes of logarithmic weight functions&quot;, Numerical Algorithms 55 (2010), 265-277.