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How to do transpose for tptrs in blas?

I want to solve:

XA = B

But it seems that tptrs only lets me solve:

AX = B

Or, using the 'transpose' flag, in tptrs:

A'X = B

which, rearranging is:

(A'X)' = B'
X'A = B'

So, I can use it to solve XA = B, but I have to first transpose B manually myself, and then, again, transpose the answer. Am I missing some trick to avoid having to do the transpose?

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What are the dimensions of A, B, and X? –  John Jun 17 '13 at 23:09
    
Undefined. A is a square lower-triangular matrix. B and X are both rectangular matrices. All are dense (of course, since it's blas). In general, A will be relatively small, whereas B and X will be long and thin. –  Hugh Perkins Jun 17 '13 at 23:11
    
I would not call it a 'trick,' but you could write your own matrix solver. –  Kyle Kanos Jun 18 '13 at 11:45

1 Answer 1

up vote 2 down vote accepted

TPTRS isn't a BLAS routine; it's an LAPACK routine.

If A is relatively small compared to B and X, then a good option to unpack it into a "normal" triangular matrix and use the BLAS routine TRSM which takes a "side" argument allowing you to specify XA = B. If A is mxm and B is nxm, the unpacking adds m^2 operations which will be a small amount of overhead compared to the O(nm^2) operations to do the solve.

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Yes, I learned about TRSM a few days ago, and it's exactly the solution I was looking for, so I will mark this as the answer. –  Hugh Perkins Jun 29 '13 at 14:43
1  
@HughPerkins: If your source A really is in packed form, note that you don't need to instantiate the complete unpacked form to use TRSM. If you want to avoid doing that, you can choose a modest tile size (say 64x64) and unpack each tile and then call TRSM for the diagonal tiles and GEMM for the off-diagonal tiles. Probably not something you need to worry about, however. –  Stephen Canon Jun 29 '13 at 14:46
    
It isn't in packed form; just I didn't initially find TSRM, and the only function I found, initially, required packed form, which I then spent effort in obtaining from my original, unpacked, form ;-) –  Hugh Perkins Jun 29 '13 at 15:39

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