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Simple Implementation of Fourth-Order WENO Interpolation

Chris Osborne, University of Glasgow, 2020, MIT License

Direct implementation from the very clear method presented in Janett et al (2019). Weighted Essentially Non-Oscillatory (WENO) techniques are used to provide high order reconstructions of data, whilst remaining stable around discontinuities. Most WENO algorithms are designed for reconstructing interface values in finite difference and finite volume codes (often assuming uniform grids). The method implemented here was designed for arbitrary interpolation on non-uniform grids.

The file weno4.py, provides one function weno4, that performs the interpolation, with optional quadratic extrapolation on the extremities (off by default). See the docstring for more information.

Running the file weno4.py directly should reproduce the test cases from the paper, and should look something like this:

Comparison of WENO4 against other interpolators on test cases

Note that this WENO scheme does not enforce monotonicity, and may introduce small under- or overshoots around extrema (although without "ringing"), which can possibly introduce negative values in the the interpolation of a strictly positive function (e.g. the modified Heaviside test case).

Prerequisites

  • python >=3.6
  • numpy (tested on 1.18.2)
  • numba (>=0.48)

If you want to run the examples:

  • scipy
  • matplotlib

Installation

pip install weno4

Reference

Janett et al (2019). A&A 624, A104