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Feb 9 |
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Efficient computation of kronecker products in C
Thanks for that! I didn't know those tricks. Very helpful :-) |
Feb 9 |
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Feb 9 |
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Feb 9 |
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Efficient computation of kronecker products in C
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Feb 8 |
comment |
Efficient computation of kronecker products in C
Thanks, that was helpful. There's a bit more documentation there too. I'll take a look at this to see if it fits my needs... |
Feb 8 |
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Feb 8 |
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Efficient computation of kronecker products in C
@Joseph: Not a typo, but more proof that I'm usually a python "coder" :P Thanks for the correction! |
Feb 8 |
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Feb 8 |
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Efficient computation of kronecker products in C
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Feb 8 |
comment |
Efficient computation of kronecker products in C
BLAS is something I've come across while poking around. However, I've had a lot of trouble getting it to work on my lab machine (can't seem to get cblas.h onto Fedora Core) or even getting through a basic tutorial. I've had a hard time finding vaguely comprehensible documentation for it. I think the people who use it and document it are operating on a slightly higher level than me :-P |
Feb 8 |
comment |
Efficient computation of kronecker products in C
Yeah there are plenty of good libraries in python (numpy, scipy) that allow you to deal with this sort easily. However, they are not strictly as efficient as C, or as portable (to our university's supercomputing facilities, for example). Also, I'd like to get my hands dirty with C as a learning experience. The appeal of C over doing this is Matlab, which already has an efficient implementation, is that it can become a lightweight python extension, and we can distribute the final framework under GPL or something similar. Thanks for the suggestion, though. |
Feb 8 |
comment |
Efficient computation of kronecker products in C
This sounds interesting. I'll look into openMP a little. (Side note: I wasn't talking about using MPI for this particular task, but more for doing this sort of computation for different vectors in parallel --- a separate issue). At the risk of sounding stupid, could you explain what you mean by "You could also try to drag some common expressions out of the inner loop" in a little more detail? |
Feb 8 |
comment |
Efficient computation of kronecker products in C
Jens: Thanks :-) Dan: Some libraries (scipy, and I think matlab) flatten the N by N matrix obtained from taking the of two N dimensional vectors (effectively their outer product) into an N*N dimensional vector. I'm not too fussed whether I get a matrix or a vector form, as long as I can sum things... |
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