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20. weight functions

1. 

   32-digit values of the first 100 recurrence coefficients for a weight function having an algebraic/scaled-logarithmic singularity at 0 with exponent a = -1/2 and power b=3

   2017-04-24 12:42:50 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R75X26Z9

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=x^a*[log(e/x)]^b on [0,1], a=-1/2, b=3

   https://purr.purdue.edu/publications/2447

2. 

   32-digit values of the first 100 recurrence coefficients for a weight function having an algebraic/scaled-logarithmic singularity at 0 with exponent a =1/2 and power b=3

   2017-04-24 12:39:08 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R79P2ZN6

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=x^a*[log(e/x)]^b on [0,1], a=1/2, b=3

   https://purr.purdue.edu/publications/2446

3. 

   32-digit values of the first 100 recurrence coefficients for the weight function having an algebraic/scaled-logarithmic singularity at 0 with exponent a=1/2 and power b=1

   2017-03-23 15:05:47 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7RV0KQJ

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=x^a*[log(e/x)]^b on [0,1], a=1/2, b=1

   https://purr.purdue.edu/publications/2443

4. 

   32-digit values of the first 100 recurrence coefficients for a weight function having an algebraic/scaled-logarithmic singularity at 0 with exponent a=-1/2 and power b=2

   2017-03-23 15:04:58 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7WM1BDT

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=x^a*[log(e/x)]^b on [0,1], a=-1/2, b=2

   https://purr.purdue.edu/publications/2442

5. 

   32-digit values of the first 100 recurrence coefficients for the weight function having an algebraic/scaled-logarithmic singularity at 0 with exponent a=-1/2 and power b=1

   2017-03-23 15:03:12 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7P26W4C

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=x^a*[log(e/x)]^b on [0,1], a=-1/2, b=1

   https://purr.purdue.edu/publications/2441

6. 

   32-digit values of the first 100 recurrence coefficients for a logarithmic weight function with rational argument

   2017-03-23 15:01:49 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7ST7MTX

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=log((1+x)/(1-x)) on [0,1]

   https://purr.purdue.edu/publications/2436

7. 

   32-digit values of the first 100 recurrence coefficients for a logarithmic weight function with rational square-root argument

   2017-03-23 14:59:26 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7XG9P5S

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=log((1+x^(1/2))/(1-x^(1/2))) on [0,1]

   https://purr.purdue.edu/publications/2439

8. 

   32-digit values of the first 100 recurrence coefficients for the exponential integral weight function E_1 on [0,Inf]

   2017-03-23 15:00:34 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R72805M5

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=E_nu(x) on (0,Inf], nu=1

   https://purr.purdue.edu/publications/2241

9. 

   32-digit values of the first 100 recurrence coefficients for a weight function with a logarithmic type singularity

   2017-03-22 22:01:23 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7BR8Q6R

   32-digit values of the first 100 recurrence coefficients for the weight function w(x)=-log(1-x^2) on [-1,1]

   https://purr.purdue.edu/publications/2438

10. 

    Associated Legendre polynomials

    2017-03-22 22:03:03 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7GH9FZH

    Matlab routines for the first N recurrence coefficients of associated Legendre polynomials

    https://purr.purdue.edu/publications/2437

11. 

    32-digit values of the first 100 recurrence coefficients for a generalized Jacobi weight function with Jacobi parameters -1/2, 3/2 and exponent -3/4

    2017-03-10 15:52:03 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7833Q1F

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=|x|^c*(1-x)^a*(1+x)^b on [-1,1], a=-1/2, b=3/2, c=-3/4

    https://purr.purdue.edu/publications/2428

12. 

    32-digit values of the first 100 recurrence coefficients for a generalized Jacobi weight function with Jacobi parameters -1/2, 3/2 and exponent 1

    2017-03-10 15:51:01 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7CV4FQ0

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=|x|^c*(1-x)^a*(1+x)^b on [-1,1], a=-1/2, b=3/2, c=1

    https://purr.purdue.edu/publications/2427

13. 

    32-digit values of the first 100 recurrence coefficients for a generalized Jacobi weight function with Jacobi parameters 3/2, -1/2 and exponent 1

    2017-03-10 15:50:23 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7HM56FQ

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=|x|^c*(1-x)^a*(1+x)^b on [-1,1], a=3/2, b=-1/2, c=1

    https://purr.purdue.edu/publications/2426

14. 

    32-digit values of the first 100 recurrence coefficients for a generalized Jacobi weight function with Jacobi parameters 3/2, -1/2 and exponent -3/4

    2017-03-10 15:49:47 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7NC5Z6H

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=|x|^c*(1-x)^a*(1+x)^b on [-1,1], a=3/2, b=-1/2, c=-3/4

    https://purr.purdue.edu/publications/2429

15. 

    32-digit values of the first 100 recurrence coefficients, obtained from moments, for a radiative transfer weight function with parameter c=16/3

    2017-03-10 15:47:54 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7PC30CQ

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=exp(-1/x) on [0,c], c=16/3

    https://purr.purdue.edu/publications/2421

16. 

    32-digit values of the first 100 recurrence coefficients, obtained from moments, for a radiative transfer weight function with parameter c=8/3

    2017-03-10 15:47:00 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7T43R2M

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=exp(-1/x) on [0,c], c=8/3

    https://purr.purdue.edu/publications/2420

17. 

    32-digit values of the first 100 recurrence coefficients, obtained from moments, for a radiative transfer weight function with parameter c=4/3

    2017-03-10 15:46:25 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7XS5SDR

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=exp(-1/x) on [0,c], c=4/3

    https://purr.purdue.edu/publications/2418

18. 

    Generalized Gegenbauer polynomials

    2017-03-03 19:33:10 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R73J39ZH

    Matlab routine for the first N recurrence coefficients of generalized Gegenbauer polynomials

    https://purr.purdue.edu/publications/2416

19. 

    32-digit values of the first 100 recurrence coefficients for a Gegenbauer weight function with parameter λ=8 multiplied by an exponential function with coefficient a=-8

    2017-02-27 13:31:33 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7W093W1

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=(1-x^2)^(λ-1/2)*exp(-a*x^2) on [-1,1], λ=8, a=-8

    https://purr.purdue.edu/publications/2414

20. 

    32-digit values of the first 100 recurrence coefficients for a Gegenbauer weight function with parameter λ=8 multiplied by an exponential function with coefficient a=8

    2017-02-27 13:30:21 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R70R9MC1

    32-digit values of the first 100 recurrence coefficients for the weight function w(x)=(1-x^2)^(λ-1/2)*exp(-a*x^2) on [-1,1], λ=8, a=8

    https://purr.purdue.edu/publications/2413