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The Future of LAPACK and ScaLAPACK www.netlib.org/lapack-dev. Jim Demmel UC Berkeley 28 Sept 2005. Outline. Motivation Participants Goals Better numerics (faster and more accurate algorithms) Expand contents (more functions, more parallel implementations) Automate performance tuning
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The Future of LAPACK and ScaLAPACKwww.netlib.org/lapack-dev Jim Demmel UC Berkeley 28 Sept 2005
Outline • Motivation • Participants • Goals • Better numerics (faster and more accurate algorithms) • Expand contents (more functions, more parallel implementations) • Automate performance tuning • Improve ease of use • Better maintenance and support • Increase community involvement (this means you!) • Questions for the audience • Selected Highlights • Concluding poem
Motivation • LAPACK and ScaLAPACK are widely used • Adopted by Cray, Fujitsu, HP, IBM, IMSL, MathWorks, NAG, NEC, SGI, … • >52M web hits @ Netlib (incl. CLAPACK, LAPACK95) • Many ways to improve them, based on • Own algorithmic research • Enthusiastic participation of research community • On-going user/vendor survey (url below) • Opportunities and demands of new architectures, programming languages • New releases planned (NSF support) • Your feedback desired • www.netlib.org/lapack-dev
Participants • UC Berkeley: • Jim Demmel, Ming Gu, W. Kahan, Beresford Parlett, Xiaoye Li, Osni Marques, Christof Voemel, David Bindel, Yozo Hida, Jason Riedy, Jianlin Xia, Jiang Zhu, undergrads… • U Tennessee, Knoxville • Jack Dongarra, Victor Eijkhout, Julien Langou, Julie Langou, Piotr Luszczek, Stan Tomov • Other Academic Institutions • UT Austin, UC Davis, Florida IT, U Kansas, U Maryland, North Carolina SU, San Jose SU, UC Santa Barbara • TU Berlin, FU Hagen, U Madrid, U Manchester, U Umeå, U Wuppertal, U Zagreb • Research Institutions • CERFACS, LBL • Industrial Partners • Cray, HP, Intel, MathWorks, NAG, SGI
Goal 1 – Better Numerics • Fastest algorithm providing “standard” backward stability • MRRR algorithm for symmetric eigenproblem / SVD: Parlett / Dhillon / Voemel / Marques / Willems • Up to 10x faster HQR: Byers / Mathias / Braman • Extensions to QZ: Kågström / Kressner • Faster Hessenberg, tridiagonal, bidiagonal reductions: van de Geijn, Bischof / Lang , Howell / Fulton • Recursive blocked layouts for packed formats: Gustavson / Kågström / Elmroth / Jonsson/
Goal 1 – Better Numerics • Fastest algorithm providing “standard” backward stability • MRRR algorithm for symmetric eigenproblem / SVD: Parlett / Dhillon / Voemel / Marques / Willems • Up to 10x faster HQR: Byers / Mathias / Braman • Extensions to QZ: Kågström / Kressner • Faster Hessenberg, tridiagonal, bidiagonal reductions: van de Geijn, Bischof / Lang , Howell / Fulton • Recursive blocked layouts for packed formats: Gustavson / Kågström / Elmroth / Jonsson/ • New: Most accurate algorithm providing “standard” speed • Iterative refinement for Ax=b, least squares • Assume availability of Extra Precise BLAS (Li/Hida/…) • www.netlib.org/blas/blast-forum/ • Jacobi SVD: Drmaĉ/Veselić
Goal 1 – Better Numerics • Fastest algorithm providing “standard” backward stability • MRRR algorithm for symmetric eigenproblem / SVD: Parlett / Dhillon / Voemel / Marques / Willems • Up to 10x faster HQR: Byers / Mathias / Braman • Extensions to QZ: Kågström / Kressner • Faster Hessenberg, tridiagonal, bidiagonal reductions: van de Geijn, Bischof / Lang , Howell / Fulton • Recursive blocked layouts for packed formats, Gustavson / Kågström / Elmroth / Jonsson/ • New: Most accurate algorithm providing “standard” speed • Iterative refinement for Ax=b, least squares • Assume availability of Extra Precise BLAS (Li/Hida/…) • www.netlib.org/blas/blast-forum/ • Jacobi SVD: Drmaĉ/Veselić • Condition estimates for (almost) everything (ongoing)
Goal 1 – Better Numerics • Fastest algorithm providing “standard” backward stability • MRRR algorithm for symmetric eigenproblem / SVD: Parlett / Dhillon / Voemel / Marques / Willems • Up to 10x faster HQR: Byers / Mathias / Braman • Extensions to QZ: Kågström / Kressner • Faster Hessenberg, tridiagonal, bidiagonal reductions: van de Geijn, Bischof / Lang , Howell / Fulton • Recursive blocked layouts for packed formats, Gustavson / Kågström / Elmroth / Jonsson/ • New: Most accurate algorithm providing “standard” speed • Iterative refinement for Ax=b, least squares • Assume availability of Extra Precise BLAS (Li/Hida/…) • www.netlib.org/blas/blast-forum/ • Jacobi SVD: Drmaĉ/Veselić • Condition estimates for (almost) everything (ongoing) • What is not fast or accurate enough?
What goes into Sca/LAPACK? For all linear algebra problems For all matrix structures For all data types For all architectures and networks For all programming interfaces Produce best algorithm(s) w.r.t. performance and accuracy (including condition estimates, etc) Need to automate and prioritize!
Goal 2 – Expanded Content • Make content of ScaLAPACK mirror LAPACK as much as possible • Full Automation would be nice, not yet robust, general enough • Telescoping languages, Bernoulli, Rose, FLAME, … • New functions (examples) • Updating / downdating of factorizations: Stewart, Langou • More generalized SVDs: Bai , Wang • More generalized Sylvester/Lyapunov eqns: Kågström, Jonsson, Granat • Structured eigenproblems • O(n2) version of roots(p) – Gu, Chandrasekaran, Zhu et al • Selected matrix polynomials: Mehrmann • How should we prioritize missing functions?
Goal 3 – Automate Performance Tuning • Not just BLAS • 1300 calls to ILAENV() to get block sizes, etc. • Never been systematically tuned • Extend automatic tuning techniques of ATLAS, etc. to these other parameters • Automation important as architectures evolve • Convert ScaLAPACK data layouts on the fly • How important is peak performance?
Goal 4: Improved Ease of Use • Which do you prefer? A \ B CALL PDGESV( N ,NRHS, A, IA, JA, DESCA, IPIV, B, IB, JB, DESCB, INFO) CALL PDGESVX( FACT, TRANS, N ,NRHS, A, IA, JA, DESCA, AF, IAF, JAF, DESCAF, IPIV, EQUED, R, C, B, IB, JB, DESCB, X, IX, JX, DESCX, RCOND, FERR, BERR, WORK, LWORK, IWORK, LIWORK, INFO)
Goal 4: Improved Ease of Use, Software Engineering (1) • Development versus Research • Development: practical approach to produce useful code • Research: If we could start over and do it right, how would we? • Life after F77? • Fortran95, C, C++, Java, Matlab, Python, … • Easy interfaces vs access to details • No universal agreement across systems on “easiest interface” • Leave decision to higher level packages • Keep expert driver / simple driver / computational routines • Conclusion: Subset of F95 for core + wrappers for drivers • What subset? • Recursion, for new data structures • Modules, to produce multiple precision versions • Environmental enquiries, to replace xLAMCH • Wrappers for Fortran95, Java, Matlab, Python, … even for CLAPACK • Automatic memory allocation of workspace
Goal 4: Improved Ease of Use, Software Engineering (2) • Why not full F95 for core? • Would make interfacing to other languages and packages harder • Some users want control over memory allocation • Why not C for core? • High cost/benefit ratio for full rewrite • Performance • Automation would be nice • Use Babel/SIDL to produce native looking interfaces when possible
Precisions beyond double (1) • Range of designs possible • Just run in quad (or some other fixed precision) • Support codes like #bits = 32 Repeat #bits = 2* #bits Solve(A, b, x, error_bound, #bits) Until error_bound < tol
Precisions beyond double (2) • Easiest approach – fixed precision • Use F95 modules to produce any precision on request • Could use QD, ARPREC, GMP, … • Keep current memory allocation (twiddle GMP…) • Next easier approach – maximum precision • Build maximum allowable precision on request • Pass in precision parameter, up to this amount • More flexible (and difficult) approach • Choose any precision at run time • Dynamically allocate all variables • Most aggressive approach • New algorithms that minimize work to get desired prec. • What do users want? • Compatibility with symbolic manipulation systems?
Goal 4: Improved Ease of Use, Software Engineering (3) • Research Issues • May or may not impact development • How to map multiple software layers to emerging architectural layers? • Are emerging HPCS languages better? • How much can we automate? Do we keep having to write Gaussian elimination over and over again? • Statistical modeling to limit performance tuning costs, improve use of shared clusters
Goal 5:Better Maintenance and Support • Website for user feedback and requests • New developer and discussion forums • URL: www.netlib.org/lapack-dev • Includes NSF proposal • Version control and bug tracking system • Automatic Build and Test environment • Wide variety of supported platforms • Cooperation with vendors • Anything else desired?
Goal 6: Involve the Community • To help identify priorities • More interesting tasks than we are funded to do • See www.netlib.org/lapack-dev for list • To help identify promising algorithms • What have we missed? • To help do the work • Bug reports, provide fixes • Again, more tasks than we are funded to do • Already happening: thank you! • We retain final decisions on content • Anything else?
Some Highlights • Putting more of LAPACK into ScaLAPACK • ScaLAPACK performance on 1D vs 2D grids • MRRR “Holy Grail” algorithm for symmetric EVD • Iterative Refinement for Ax=b • O(n2) polynomial root finder • Generalized SVD
Missing matrix types in ScaLAPACK • Symmetric, Hermitian, triangular • Band, Packed • Positive Definite • Packed • Orthogonal, Unitary • Packed
Speedups for using 2D processor grid range from 2x to 8x Times obtained on: 60 processors, Dual AMD Opteron 1.4GHz Cluster w/Myrinet Interconnect 2GB Memory
Cost of redistributing matrix to optimal layout is small Times obtained on: 60 processors, Dual AMD Opteron 1.4GHz Cluster w/Myrinet Interconnect 2GB Memory
MRRR Algorithm for eig(tridiagonal) and svd(bidiagonal) • “Multiple Relatively Robust Representation” • 1999 Householder Award honorable mention for Dhillon • O(nk) flops to find k eigenvalues/vectors of nxn tridiagonal matrix (similar for SVD) • Minimum possible! • Naturally parallelizable • Accurate • Small residuals || Txi – li xi || = O(n e) • Orthogonal eigenvectors || xiTxj || = O(n e) • Hence nickname: “Holy Grail” • 2 versions • LAPACK 3.0: large error on “hard” cases • Next release: fixed! • How should we tradeoff speed and accuracy?
Timing of Eigensolvers(1.2 GHz Athlon, only matrices where time > .1 sec)
Timing of Eigensolvers(1.2 GHz Athlon, only matrices where time > .1 sec)
Timing of Eigensolvers(1.2 GHz Athlon, only matrices where time > .1 sec)
Accuracy Results (old vs new Grail) || QQT – I || / (n e ) maxi ||Tqi – li qi || / ( n e )
Accuracy Results (Grail vs QR vs DC) || QQT – I || / (n e ) maxi ||Tqi – li qi || / ( n e )
With extra precise iterative refinement More Accurate: Solve Ax=b Conventional Gaussian Elimination 1/e e e = n1/22-24
What’s new? • Need extra precision (beyond double) • Part of new BLAS standard • Cost = O(n2) extra per right-hand-side, vs O(n3) to factor • Get tiny componentwise bounds too • Error in xi small compared to |xi|, not just maxj |xj| • “Guarantees” based on condition number estimates • No bad bounds in 6.2M tests • Different condition number for componentwise bounds • Traditional iterative refinement can “fail” • Only get “matrix close to singular” message when answer wrong? • Extends to least squares • Demmel, Kahan, Hida, Riedy, X. Li, Sarkisyan, … • LAPACK Working Note # 165
Can condition estimators lie? • Yes, but rarely, unless they cost as much as matrix multiply = cost of LU factorization • Demmel/Diament/Malajovich (FCM2001) • But what if matrix multiply costs O(n2)? • Cohn/Umans/Kleinberg (FOCS 2003/5)
C(p)= -p1 -p2 … -pd 1 0 … 0 0 1 … 0 … … … … 0 … 1 0 New algorithm for roots(p) • To find roots of polynomial p • Roots(p) does eig(C(p)) • Costs O(n3), stable, reliable • O(n2) Alternatives • Newton, Jenkins-Traub, Laguerre, … • Stable? Reliable? • New: Exploit “semiseparable” structure of C(p) • Low rank of any submatrix of upper triangle of C(p) preserved under QR iteration • Complexity drops from O(n3) to O(n2) • Related work: Gemignani, Bini, Pan, et al • Ming Gu, Shiv Chandrasekaran, Jiang Zhu, Jianlin Xia, David Bindel, David Garmire, Jim Demmel
Properties of new roots(p) • First (?) algorithm that • Is O(n2) • Is backward stable, in the matrix sense • Is backward stable, in the sense that the computed roots are the exact roots of a slightly perturbed input polynomial • Depends on balancing = scaling roots by a constant • Still need to automate choice of • Byers, Mathias, Braman • Tisseur, Higham, Mackey …
New GSVD Algorithm: Timing Comparisons • 1.0GHz Itanium–2 (2GB RAM); • Intel's Math Kernel Library 7.2.1 (incl. BLAS, LAPACK) Bai et al, UC Davis PSVD, CSD on the way
Conclusions • Lots to do in Dense Linear Algebra • New numerical algorithms • Continuing architectural challenges • Parallelism, performance tuning • Grant support, but success depends on contributions from community
Downa Dating With apologies to Robert Burns & Nick Higham Should some equations be forgot when overdetermīned? Should some equations be forgot using hyperbolic sines? With hyperbolic sines, my dear with hyperbolic sines, We’ll hope to get some boundedness with hyperbolic sines.
New GSVD Algorithm (XGGQSV) • UT A Z =∑a( 0 R ), VT B Z =∑b( 0 R ); A: M x N, B: P xN • Modified Van Loan's method • (1) Pre-processing: reveal rank of ( AT ; BT )T • (2) Split QR: reduce two upper triangular into one • (3) CSD: Cosine-Sine Decomposition • (4) Post-processing: assemble resulted matrices • Workspace = (max(M, N, P)) + 5L2 where L = rank(B) • Outperforms current XGGSVD in LAPACK
Profile of SGGQSV • 1.0GHz Itanium–2 (2GB RAM); • Intel's Math Kernel Library 7.2.1 (incl. BLAS, LAPACK)
Related New Routines • CSD (XORCSD) • UTQ1Z =∑a, VTQ2Z =∑b • Based on Von Loan's method (1985) • Dominated by the cost of SVD • Workspace =(Max(P+M, N)) • PSVD (XGGPSV) • UTABV = ∑ • Based on work by Golub, Solna, Van Dooren (2000) • Workspace =(Max(M, P, N))
Benchmark Details • AMD 1.2 GHz Athlon, 2GB mem, Redhat + Intel compiler • Compute all eigenvalues and eigenvectors of a symmetric tridiagonal matrix T • Codes compared: • qr: QR iteration from LAPACK: dsteqr • dc: Cuppen’s Divide&Conquer from LAPACK: dstedc • gr: New implementation of MRRR algorithm (“Grail”) • ogr: MRRR from LAPACK 3.0: dstegr (“old Grail”)
Timing of Eigensolvers(1.2 GHz Athlon, only matrices where time > .1 sec
Timing of Eigensolvers(1.2 GHz Athlon, only matrices where time > .1 sec)
More Accurate: Solve Ax=b • Old idea: Use Newton’s method on f(x) = Ax-b • On a linear system? • Roundoff in Ax-b makes it interesting (“nonlinear”) • Iterative refinement • Snyder, Wilkinson, Moler, Skeel, … Repeat r = Ax-b … compute with extra precision Solve Ad = r … using LU factorization of A Update x = x – d Until “accurate enough” or no progress
Speedups from 1.33x to 11.5x Times obtained on: 60 processors, Dual AMD Opteron 1.4GHz Cluster w/Myrinet Interconnect 2GB Memory
Times obtained on: 60 processors, Dual Opteron 1.4GHz, 64-bit machine 2GB Memory, Myrinet Interconnect