Tags: Software source code

All Categories (1-15 of 15)

  1. Text Mining and Plotting Tools for KSA / DS / HEI Research Study

    2018-07-25 15:56:19 | Datasets | Contributor(s): Corey S Seliger | doi:10.4231/R7MK6B49

    This publication comprises the source code for various text mining utilities written against the Stanford CoreNLP project and other scripts to plot the formatted output from those programs.


  2. OPQ: A Matlab suite of programs for generating orthogonal polynomials and related quadrature rules

    2017-03-29 14:16:04 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7959FHP

    This is a set of Matlab codes and data files for generating orthogonal polynomials and related quadrature rules.


  3. SOPQ: Symbolic OPQ

    2015-12-30 00:00:00 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7ZG6Q6T

    This includes symbolic versions of some of the more important OPQ routines.


  4. POEXPINT: Polynomials orthogonal with respect to the exponential integral

    2014-04-28 13:01:06 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7X34VD9

    Matlab scripts for computing orthogonal polynomials whose weight function involves an exponential integral


  5. CHA: Matlab programs for computing a challenging integral

    2014-04-22 16:52:36 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7QJ7F7V

    Matlab and FORTRAN codes to evaluate a densely and wildly oscillatory integral that had been proposed as a computational problem in the SIAM 100-Digit Challenge.


  6. MCD: Matlab programs for computing the Macdonald function for complex orders

    2014-04-22 16:50:55 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7B8562S

    A collection of FORTRAN and Matlab codes and their outputs to compute the Macdonald function for complex orders by numerical quadrature.


  7. HPGT: High-precision Gauss-Turan quadrature rules

    2014-04-22 16:49:13 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R71V5BW8

    Matlab routines that calculate high-precision Gauss-Turan quadrature rules


  8. NEUTRAL: Neutralizing nearby singularities in numerical quadrature

    2014-04-22 16:46:34 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R75H7D6P

    Matlab routines for neutralizing nearby singularities in numerical quadrature


  9. RMOP: Repeated modifications of orthogonal polynomials

    2014-04-22 16:42:59 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7F18WNB

    Matlab routines and data sets that compute repeated modifications of orthogonal polynomials


  10. SRJAC: Sub-range Jacobi polynomials

    2014-04-22 16:40:02 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7JS9NCR

    Matlab routines for computing sub-range Jacobi polynomials within the sub interval of [-1, 1]


  11. HOGGRL: High-order generalized Gauss-Radau and Gauss-Lobatto Formulae for Jacobi and Laguerre weight functions

    2014-04-22 16:38:33 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7G15XSQ

    Matlab source codes and files that compute the high-order Gauss-Radau and Gauss-Lobatto formulae for Jacobi and Laguerre weight functions


  12. OCVdM: Optimally conditioned Vandermonde matrices

    2014-04-22 16:36:58 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7TB14TB

    Matlab routines for computing optimally conditioned Vandermonde matrices


  13. LAMBERTW: Matlab programs for evaluating the Lambert W-functions and some of their integrals

    2014-04-22 16:33:58 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7Z31WJP

    Matlab programs for evaluating the Lambert W-functions and some of their integrals


  14. GQLOG: Matlab routines for computing Gauss Quadrature rules with logarithmic weight functions

    2014-04-22 16:31:00 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R72R3PMB

    Matlab routines for computing Gauss Quadrature rules with logarithmic weight functions


  15. BIJ: Matlab programs for testing and extending Bernstein's Inequality for Jacobi polynomials

    2014-04-22 16:27:27 | Datasets | Contributor(s): Walter Gautschi | doi:10.4231/R7V985Z5

    Bernstein’s inequality for Jacobi polynomials is analyzed here analytically and computationally with regard to validity and sharpness


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