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I was looking over the performance benchmarks:

And I could not help but notice that eigen appears to consistently outperform all the specialized vendor libraries. The questions is: how is it possible? One would assume that mkl/goto would use processor specific tuned code, while eigen is rather generic.

Notice this, essentially a dgemm. For N=1000 Eigen gets roughly 17Gf, MKL only 12Gf

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Those are interesting benchmarks to which you link. I admit that I am initially skeptical of them. Of course, it is possible that someone has come up with a radical improvement on ATLAS, but I wonder if the plots to which you link don't rely on some unusual, special case. The reason I ask is because I have been using ATLAS for years, and moreover working with and corresponding with others who use ATLAS, and (unless I misunderstand the benchmarks) I've heard no whisper of benchmarks like this. But, hey, maybe I'll learn something here today. – thb Apr 28 '12 at 17:59
@thb Those are my thoughts exactly. I can readily believe Atlas may be slower than MKL but slower than Eigen by such huge margins?! – Anycorn Apr 28 '12 at 18:02
IN provided graphs, Eigen loses with small matrix sizes in certain comparisons. I also think that you should be able to run benchmarks yoursefl and profile them - to see "WHY" there is difference performance. – SigTerm Apr 28 '12 at 18:41
It is also strange that a logarithmic scaling was used for the matrix dimensions. IMHO this makes no sense. It is clear that for small dimensions peak performance can not be reached. One is usually interested "how fast" peak performance can be reached if dimensions get increased. I used the ATLAS benchmark suite to compare DGEMM of some BLAS libraries (including Eigen) on a Intel Core-2-Duo here: I get similar results on other architectures. In each case MKL and ATLAS achieved a higher performance than Eigen. – Michael Lehn Oct 12 '14 at 17:56

5 Answers 5

Eigen has lazy evaluation. From How does Eigen compare to BLAS/LAPACK?:

For operations involving complex expressions, Eigen is inherently faster than any BLAS implementation because it can handle and optimize a whole operation globally -- while BLAS forces the programmer to split complex operations into small steps that match the BLAS fixed-function API, which incurs inefficiency due to introduction of temporaries. See for instance the benchmark result of a Y = a*X + b*Y operation which involves two calls to BLAS level1 routines while Eigen automatically generates a single vectorized loop.

The second chart in the benchmarks is Y = a*X + b*Y, which Eigen was specially designed to handle. It should be no wonder that a library wins at a benchmark it was created for. You'll notice that the more generic benchmarks, like matrix-matrix multiplication, don't show any advantage for Eigen.

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I am more concerned with gemms - A*A' are noticably faster than mkl and only slighly slower than Goto. Almost 30% fast than mkl for N=1000. – Anycorn Apr 28 '12 at 18:09
You should note that Goto hasn't been maintained for a while now. Some new people took over the code base and have migrated to OpenBLAS. – chrisaycock Apr 28 '12 at 18:10
that does not explain the huge margin over mkl – Anycorn Apr 28 '12 at 18:14
Hmm, I've been digging around BLAS Level 3 docs to remember some of this stuff. GEMM performs a C += A*B rather than C = A*B, right? Ie, BLAS requires addition of the original matrix, even if it's all zeros? That seems like extra overhead. Also, GEMM takes the transpose ops for A and B, which means there's some sort of runtime conditional that must be applied in BLAS. Eigen wouldn't have either of those problems since it would be known at compile-time the exact action to perform. – chrisaycock Apr 28 '12 at 18:32
the Transpose is handled by basically exchange in the order of the three nested loops. Number of additions is only N^2 versus N^3 multiplies, very negligible. If interested, – Anycorn Apr 28 '12 at 18:47

About the comparison ATLAS vs. Eigen

Have a look at this thread on the Eigen mailing list starting here:

It shows for instance that ATLAS outperforms Eigen on the matrix-matrix product by 46%:

More benchmarks results and details on how the benchmarks were done can be found here:


For my lecture "Software Basics for High Performance Computing" I created a little framework called ulmBLAS. It contains the ATLAS benchmark suite and students could implement their own matrix-matrix product based on the BLIS papers. You can have a look at the final benchmarks which also measure Eigen:

You can use the ulmBLAS framework to make your own benchmarks.

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Thank you Michael for the ulmBlas developement pages, these are very interesting -- it's quite fascinating that you get rather close to the MKL in terms of performance. – davidhigh Jan 10 at 22:08

I sent the same question to the ATLAS mailing list some time ago:

Clint (the ATLAS developer) does not trust these benchmarks. He suggested some trustworthy benchmark procedure. As soon as I have some free time I will do this kind of benchmarking.

If the BLAS functionality of Eigen is actually faster then that of GotoBLAS/GotoBLAS, ATLAS, MKL then they should provide a standard BLAS interface anyway. This would allow linking of LAPACK against such an Eigen-BLAS. In this case, it would also be an interesting option for Matlab and friends.

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They actually do provide blas bindings, compile time has option to build them – Anycorn Jun 10 '12 at 17:47
I know. And if I have some free time then I will perform the benchmarks as suggested by Clint. However, I would prefer that the Eigen team also does this. The problem with benchmarking any templated C++ libraries are these endless discussions about what compiler version and options have to be used. Compared to that building a library like ATLAS is much more robust in this respect. So I would like to see what benchmarks are actually possible if the Eigen people use their optimal compiler configuration and run such a "BLAS/LAPACK benchmark". – Michael Lehn Jun 10 '12 at 18:56
Using Eigen with a BLAS interface is downright silly. Eigen shines because it can optimize entire expressions, often generating a vectorizable loop that encompasses all operations. With BLAS-like interfaces, if there's no API available for a particular expression, you have to introduce temporary variables for subexpressions, and that kills performance. Eigen's performance depends on the fact that it leverages the code generation facilities of the C++ compiler. No C-based API can do that, unless the C implementation uses a smart just-in-time compiling runtime (none popular do). – Kuba Ober Jun 12 '12 at 17:46
You don't get the point: 1) Functions defined in the BLAS standard are those that are most crucial for the performance of numerical software. For example, a matrix-matrix product of the form (gemm) C = betaC + alphaA*B. 2) The Eigen people claim that they can perform this operation faster than ATLAS or GotoBLAS. And there is doubt that this is true. So the point of interest for the high performance computing people is: How can one check if Eigen is capable to actually do gemm faster then MKL, ATLAS, GotoBLAS. – Michael Lehn Jun 12 '12 at 18:12
@KubaOber. Beside this, another question is: Are the benchmarks published by the Eigen people trustworthy? They use some questionable benchmark suite. And it is strange that they claim to outperform established libraries but do not inform the maintainer of these libraries about the results (the ATLAS guy never even heard of them). I mean, at least you have to give the others the chance to response and comment the results. – Michael Lehn Jun 12 '12 at 19:15

It doesn't seem to consistently outperform other libraries, as can be seen on the graphs further down on that page you linked. So the different libraries are optimized for different use cases, and different libraries are faster for different problems.

This is not surprising, since you usually cannot optimize perfectly for all use cases. Optimizing for one specific operation usually limits the optimization options for other use cases.

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But the core - gemm - are either the fastest or second fastest. For example A*A' are noticably faster than mkl. – Anycorn Apr 28 '12 at 18:06
Eigen has the potential of outperforming other libraries on long expressions, because it can optimize the entire expression and generate code for it as a whole. Nothing that has C- or FORTAN-like API has this capability. For this functionality you need C++, Lisp, or something running on top of CLR (C#, F#, etc). – Kuba Ober Jun 12 '12 at 17:48

Eigen uses highly tuned code as detailed in its documentation.

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Yes, they use SSE/AVX as available and do tiling. But so does every other math library, eg Atlas. – Anycorn Apr 28 '12 at 17:57
@Anycorn Atlas isn't manually tuned for specific architectures. – chrisaycock Apr 28 '12 at 17:59
Atlas is automatically tuned - they still pretty much rely on tiling/SSE - with tile sizes extracted from tests. – Anycorn Apr 28 '12 at 18:00
+1. For what it's worth, Dirk Eddelbuettel knows what he's talking about. He's been packaging, and handling bug reports against, software that does this sort of thing for -- I don't know, how long has it been, Dirk? Ten years? Twelve? Fifteen? Anyway, he speaks with authority. – thb Apr 28 '12 at 18:03
All good points. What Atlas tunes, as I remember, is different 'chunk sizes' to best match given hardware cache sizes etc so that performance is 'optimal' given to the empirical metric. Whereas Eigen uses template programming to move some logic 'out of the expression' as Chris Aycock kindly noted is his answer. – Dirk Eddelbuettel Apr 28 '12 at 18:49

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