32-digit values of the first 65 recurrence coefficients for orthogonal polynomials relative to a weight function on [0,1] containing an algebraic singularity with exponent 1/2 and exponential/logarithmic factors

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By Walter Gautschi

Purdue University

32-digit values of the first 65 recurrence coefficients for the weight function w(x)=x^(1/2)*exp(-x)*log(1+1/x) on [0,1]

Version 1.0 - published on 09 May 2017 doi:10.4231/R7JS9NFN - cite this Archived on 10 Jun 2017

Licensed under Attribution 3.0 Unported

Description

32-digit values of the first 65 recurrence coefficients for orthogonal polynomials relative to the weight function w(x)=x^(1/2)*exp(-x)*log(1+1/x) on [0,1], are computed by a 2-component discretization method using the routine sr_explogalg1half01(32,65), where dig=36 has to be entered when prompted by the routine. The number 36 of digits has been determined by the routine dig_explogalg1half01(65,32,4,32). Both of these routines make use of the 200 recurrence coefficients for the weight function x^(1/2)*log(1/x) on [0,1] provided in the dataset doi: 10.4231/R7V9863C. This is the reason why only 65 recurrence coefficients are produced in the present dataset. If more are desired, the dataset for x^(1/2)*log(1/x) would have to be revised so as to generate sufficiently more than 200 recurrence coefficients.

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The dataset consists of two text files and ten Matlab scripts.

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