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I've recently implemented Fisher's Linear Discriminant (FLD) in Lisp. Hitherto I've been using samples of dim(<10), with populations of order 10 with which FLD executed immediately. This morning I used real-world data with dim(5) and populations of order 104, and the program has been running for a few hours now on my AMD Athlon(tm) II Dual-Core M320 × 2 laptop. Here are the sizes of the files I'm using:

 $ wc output_sig.txt
 13000  65000 627677 output_sig.txt
 $ wc output_bkg.txt
 13000  65000 644621 output_bkg.txt

In view of the above, how does the computation time of FLD scale with sample size and dimensionality? Is a few hours computation time to be expected here?

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Thanks, I'll insert print statements and create a log file. I may need a dedicated PC. –  Bracket Dec 4 '12 at 8:19
You may want to look at installing a profiler to inspect percent time spent in each function. The time macro may also be of some help. –  Clayton Stanley Dec 5 '12 at 6:20
Thanks, I'm in the process of installing SLIME- emacs seems to have attractive profilers. –  Bracket Dec 5 '12 at 14:56
Bracket: do an asymptotic analysis of the algorithm itself, then investigate the costs for each of your access/write times. That should give you the deepest understanding of what's going on. Also, you might want to post your code. :-) –  Paul Nathan Dec 6 '12 at 21:19
Thanks, I'll have to use a bit of CPU time to get T(n)->infinity for the asymptotic part, but it's definitely worth it. I could iterate those steps also. –  Bracket Dec 10 '12 at 22:32

1 Answer 1

Without knowing the code: LDA is basically a generalized eigenvalue problem, so the problem is solved if one uses a sufficiently efficient linear algebra routine. Handwritten routines in LISP will usually be not very efficient, so I recommend using a LAPACK wrapper such as Matlisp.

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Thanks, I've actually written a small matrix library myself, which I can compile to C using ECL. –  Bracket Dec 10 '12 at 22:36
Coding it in native C is only part of the package, the BLAS libraries with the primitive matrix operations should also optimally be fine-tuned for the processor to minimize cache misses. The ATLAS system is an attempt to achieve this: math-atlas.sourceforge.net Unless you're very well versed in numerical linear algebra, this is not a part I'd try coding from scratch. –  Frederik Kaster Dec 11 '12 at 9:54

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