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I'm looking for a super duper numerical quadrature function. It should have the following three properties:

  • Adaptive - it automatically adjusts the density of sampling points to fit the integrand. This is absolutely necessary because my integrand is very nonuniform and expensive to compute.
  • Vectorized - it calls the integrand on lists of sample points rather than one point at a time, for efficiency.
  • Able to handle vector-valued functions - all components of the vector-valued integrand are computed at the same time for no additional cost, so it makes no sense to integrate all the components separately.

In addition, it should be:

  • 2D - the integral I want to compute is a double integral over a planar region, and I want to be able to specify an overall (relative) tolerance for the whole integral and have it manage the error budget appropriately.

Does anybody know of a library that has such a function? Even two or three of the four properties would be better than nothing.

I'm using Python and SciPy, so if it already works with Python that's a bonus. (But I'm also able to write glue code to let it call my integrand if necessary.)

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Alas, no answers yet! I am writing my own numerical integration algorithm in C#. It is adaptive and handles N-dimensions, but is not vectorized, however. Getting the terminating conditions (tolerance) right is proving difficult. –  Paul Chernoch Oct 1 '12 at 21:38
    
@Keenan Pepper Maybe the process described in this question can give you some insight –  Saullo Castro May 18 '13 at 12:36

1 Answer 1

I used this library, it does everything you want, except it is written in C. But it also has an R interface, so maybe you can call R from Python (that is possible).

http://ab-initio.mit.edu/wiki/index.php/Cubature_(Multi-dimensional_integration)

Or, you can call the library using ctypes (it is not straight forward, but it is doable).

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