- Jules Kouatchou ([email protected])
- Alexander Medema
We use simple test cases to compare various high level programming languages (Python, Julia, Matlab, IDL, R, Java, Scala, C, Fortran). We implement the test cases from an angle of a novice programmer who is not familiar with the optimization techniques available in the languages. The goal is to highlight the strengths and weaknesses of each language but not to claim that one language is better than the others.
Check the following webpages to obtain background information on this project:
The test cases are listed in categories that include:
- Loops and Vectorization
- String Manipulations
- Numerical Calculations
- Input/Output
Each test is "simple" enough to be quickly written in any of the languages and is meant to address issues such as:
- Access of non-contiguous memory locations
- Use of recursive functions,
- Utilization of loops or vectorization,
- Opening of a large number of files,
- Manipulation of strings of arbitrary lengths,
- Multiplication of matrices,
- Use of iterative solvers
- etc.
The source files are contain in the directories:
C\ Fortran\ IDL\ Java\ Julia\ Matlab\ Python\ R\ Scala\
There is also a directory Data
that contains a Python script that generates
the NetCDF4 files needed for the test case on reading a large collection of files.
It also has sample text files for the Count Unique Words in a File test case.
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Copy Multidimensional Arrays
Given an aribitraty n x n x 3 matrix A we perform the operations: A(i,j,1) = A(i,j,2) A(i,j,3) = A(i,j,1) A(i,j,2) = A(i,j,3) using loops and vectorization.
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Look and Say Sequence
The look and say sequence reads a single integer. In each subsequent entry, the number of appearances of each integer in the previous entry is concatenated to the front of that integer. For example, an entry of 1223 would be followed by 112213, or "one 1, two 2's, one 3." Here, we start with the number 1223334444 and determine the look and say sequence of order n (as n varies).
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Count Unique Words in a File
We open an arbitrary file and count the number of unique words in it with the assumption that words such as: ab Ab aB a&*(-b: 17;A#~!b are the same. For our tests, we use the four files: world192.txt, plrabn12.txt, bible.txt, and book1 taken from the website (The Canterbury Corpus): http://corpus.canterbury.ac.nz/descriptions/
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Fibonacci Sequence
The Fibonacci Sequence is a sequence of numbers where each successive number is the sum of the two that precede it: F_n = F_n-1 + F_n-2 . Its first entries are F_0 = 0 , F_1 = F_2 = 1 . We measure the elapsed time when calculating an nth Fibonacci number. The calculation times are taken for both iterative and recursive calculation methods.
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Matrix Multiplication
Two randomly generated n x n matrices A and B are multiplied. The time to perform the multiplication is measured. This test highlights the importance of using the language's built-in libraries.
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Belief Propagation Algorithm
Belief propagation is an algorithm used for inference, often in the fields of artificial intelligence, speech recognition, computer vision, image processing, medical diagnostics, parity check codes, and others. The algorithm requires repeated matrix multiplication and then a normalization of the matrix. This test measures the elapsed time when performing n iterations of the algorithm.
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Metropolis-Hastings Algorithm
The Metropolis-Hastings algorithm is a an algorithm used to determine random samples from a probability distribution. This implementation uses a two-dimensional distribution (Domke 2012), and measures the elapsed time to iterate n times.
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Compute the FFTs
We create a n x n matrix M that randomn random complex values. We the compute the Fast Fourier Transform (FFT) of M and the absolute value of the result.
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Iterative Solver
We use the Jacobi iterative solver to numerically approximate the solution of the two-dimensional Laplace equation (that was discretized with a fouth order compact schems) to a differential equation. we record the elapsed time as the number of grid point varies.
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Square Root of a Matrix
Given an n x n matrix A, we are looking for the matrix B such that: B * B = A In our calculations, we consider A with 6s on the diagonal and 1s elsewhere.
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Gauss-Legendre quadrature
Gauss-Legendre quadrature is a numerical method for approximating definite integrals. It uses a weighted sum of n values of the integrand function. The result is exact if the integrand function is a polynomial of degree 0 to 2n - 1. Here we consier an exponential function over the interval [-3,3] and record the time to perform the integral when n varies.
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Function evaluations
We iteratively calculate trigonometric functions on an n-element list of values, and then compute inverse trigonometric functions on the same list. The time to complete the full operations is measured as n varies.
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Munchausen Numbers
A Munchausen number is a natural number that is equal to the sum of its digits raised to each digit's power. In base 10, there are four such numbers: 0, 1, 3435 and 438579088. We determine how much time it takes to find them.
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Reading a Large Collection of Files
We have a set of daily NetCDF files (7305) covering a period of 20 years. The files for a given year are in a sub-directory labeled YYYY (for instance Y1990, Y1991, Y1992, etc.). We want to write a script that opens each file, reads a three-dimensional variable (longitude/latitude/level), and manipulates it. A pseudo code for the script reads: Loop over the years Obtain the list of NetCDF files Loop over the files Read the variable (longitude/latitude/level) Compute the zonal mean average (new array of latitude/level) Extract the column array at latitude 86 degree South Append the column array to a "master" array (or matrix) The goal is to be able to do a generate the three-diemsional arrays (year/level/value) and carry out a contour plot.
September 2019