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High Performance Robust Datamining for Cheminformatics

High Performance Robust Datamining for Cheminformatics. Division of Chemical Information Session: Cheminformatics: From Teaching to Research ACS Spring Meeting New Orleans April 8 2008 Geoffrey Fox Community Grids Laboratory , School of informatics Indiana University

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High Performance Robust Datamining for Cheminformatics

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  1. High Performance Robust Datamining for Cheminformatics Division of Chemical Information Session: Cheminformatics: From Teaching to Research ACS Spring Meeting New Orleans April 8 2008 Geoffrey Fox Community Grids Laboratory, School of informatics Indiana University http://www.chembiogrid.org http://www.infomall.org/multicore gcf@indiana.edu, http://www.infomall.org 1

  2. Too much Computing? Historically both grids and parallel computing have tried to increase computing capabilities by Optimizing performance of codes at cost of re-usability Exploiting all possible CPU’s such as Graphics co-processors and “idle cycles” (across administrative domains) Linking central computers together such as NSF/DoE/DoD supercomputer networks without clear user requirements Next Crisis in technology area will be the opposite problem – commodity chips will be 32-128way parallel in 5 years time and we currently have no idea how to use them on commodity systems – especially on clients Only 2 releases of standard software (e.g. Office) in this time span so need solutions that can be implemented in next 3-5 years Intel RMS analysis: Gaming and Generalized decision support (data mining) are ways of using these cycles

  3. Intel’s Projection

  4. Too much Data to the Rescue? • Multicore servers have clear “universal parallelism” as many users can access and use machines simultaneously • Maybe also need application parallelism (e.g. datamining) as needed on client machines • Over next years, we will be submerged of course in data deluge • Scientific observations for e-Science including cheminformatics (high throughput screening) • Local (video, environmental) sensors • Data fetched from Internet defining users interests • Maybe data-mining of this “too much data” will use up the “too much computing” both for science and commodity PC’s • PC will use this data(-mining) to be intelligent user assistant? • Must have highly parallel algorithms and new algorithms for large datasets

  5. OSCAR Document Analysis InChI Generation/Search Computational Chemistry (Gamess, Jaguar etc.) Varuna.net Quantum Chemistry CICC Chemical Informatics and Cyberinfrastructure Collaboratory Web Service Infrastructure Dimension ReductionEmbedding Need to make all this parallel Hide parallelism in service Portal Services RSS Feeds User Profiles Collaboration as in Sakai Core Grid Services Service Registry Job Submission and Management Local Clusters IU Big Red, TeraGrid, Open Science Grid

  6. Service Aggregated Linked Sequential Activities SALSATeam (funded by Geoffrey Fox Microsoft) Xiaohong Qiu Seung-Hee Bae Huapeng Yuan Indiana University Technology Collaboration George Chrysanthakopoulos Henrik Frystyk Nielsen Microsoft Application Collaboration Cheminformatics (funded by NIH Rajarshi Guha ECCR) David Wild Bioinformatics Haiku Tang Demographics (GIS) Neil Devadasan IU Bloomington and IUPUI GOALS:Increasing number of cores accompanied by continueddata deluge Develop scalable parallel data mining algorithms with good multicore and cluster performance; understand software runtime and parallelization method. Use managed code (C#) and packagealgorithms as services to encourage broad use assuming experts parallelize core algorithms. CURRENT RESUTS: Microsoft CCR supports MPI, dynamic threading and via DSS a Service model of computing; detailed performance measurements Speedups of 7.5 or above on 8-core systems for “large problems” with deterministic annealed (avoid local minima) algorithms forclustering, Gaussian Mixtures, GTM and MDS (dimensional reduction)etc. SALSA

  7. General Problem Classes N data points X(x) in D dimensional space OR points with dissimilarity ijdefined between them • Unsupervised Modeling • Find clusters without prejudice • Model distribution as clusters formed from Gaussian distributions with general shape • Both can use multi-resolution annealing • Dimensional Reduction/Embedding • Given vectors, map into lower dimension space “preserving topology” for visualization: SOM and GTM • Given ijassociate data points with vectors in a Euclidean space with Euclidean distance approximately ij: MDS (can anneal) and Random Projection Data Parallel over N data points X(x) SALSA

  8. Deterministic Annealing • Minimize Free Energy F = E-TS where E objective function (energy) and S entropy. • Reduce temperature T logarithmically; T=  is dominated by Entropy, T small by objective function • S regularizes E in a natural fashion • In simulated annealing, use Monte Carlo but in deterministic annealing, use mean field averages • <F> =  exp(-E0/T) F over the Gibbs distribution P0 = exp(-E0/T) using an energy function E0 similar to E but for which integrals can be calculated • E0 = E for clustering and related problems • General simple choice is E0 =  (xi - i)2where xi parameters to be annealed • E.g. MDS has quartic E and replace this by quadratic E0

  9. N data points E(x) in D dim. space and Minimize F by EM • Deterministic Annealing Clustering (DAC) • a(x) = 1/N or generally p(x) with  p(x) =1 • g(k)=1 and s(k)=0.5 • T is annealing temperature varied down from  with final value of 1 • Vary cluster centerY(k) • K starts at 1 and is incremented by algorithm; pick resolution NOT number of clusters • My 4th most cited article but little used; probably as no good software compared to simple K-means • Avoid local minima SALSA

  10. Deterministic Annealing Clustering of Indiana Census Data Decrease temperature (distance scale) to discover more clusters Distance ScaleTemperature0.5

  11. DeterministicAnnealing F({Y}, T) Solve Linear Equations for each temperature Nonlinearity removed by approximating with solution at previous higher temperature • Minimum evolving as temperature decreases • Movement at fixed temperature going to local minima if not initialized “correctly” Configuration {Y}

  12. Deterministic Annealing Clustering (DAC) • Traditional Gaussian • mixture models GM • Generative Topographic Mapping (GTM) • Deterministic Annealing Gaussian Mixture models (DAGM) • a(x) = 1/N or generally p(x) with  p(x) =1 • g(k)=1 and s(k)=0.5 • T is annealing temperature varied down from  with final value of 1 • Vary cluster centerY(k) but can calculate weightPkand correlation matrixs(k) =(k)2(even for matrix (k)2) using IDENTICAL formulae for Gaussian mixtures • K starts at 1 and is incremented by algorithm • a(x) = 1 and g(k) = (1/K)(/2)D/2 • s(k) =1/ and T = 1 • Y(k) = m=1MWmm(X(k)) • Choose fixed m(X) = exp( - 0.5 (X-m)2/2 ) • Vary Wm andbut fix values of M and Ka priori • Y(k) E(x) Wm are vectors in original high D dimension space • X(k) and m are vectors in 2 dimensional mapped space • As DAGM but set T=1 and fix K • a(x) = 1 • g(k)={Pk/(2(k)2)D/2}1/T • s(k)=(k)2(taking case of spherical Gaussian) • T is annealing temperature varied down from  with final value of 1 • Vary Y(k) Pkand(k) • K starts at 1 and is incremented by algorithm • DAGTM: Deterministic Annealed Generative Topographic Mapping • GTM has several natural annealing versions based on either DAC or DAGM: under investigation • DAMDS different form as different Gibbs distribution (different E0) N data points E(x) in D dim. space and Minimize F by EM SALSA

  13. Speedup = Number of cores/(1+f) f = (Sum of Overheads)/(Computation per core) Computation  Grain Size n . # Clusters K Overheads are Synchronization:small with CCR Load Balance: good Memory Bandwidth Limit:  0 as K   Cache Use/Interference: Important Runtime Fluctuations: Dominant large n, K All our “real” problems have f ≤ 0.05 and speedups on 8 core systems greater than 7.6 SALSA

  14. Runtime System Used • We implement micro-parallelism using Microsoft CCR(Concurrency and Coordination Runtime) as it supports both MPI rendezvous and dynamic (spawned) threading style of parallelism http://msdn.microsoft.com/robotics/ • CCR Supports exchange of messages between threads using named ports and has primitives like: • FromHandler: Spawn threads without reading ports • Receive: Each handler reads one item from a single port • MultipleItemReceive: Each handler reads a prescribed number of items of a given type from a given port. Note items in a port can be general structures but all must have same type. • MultiplePortReceive: Each handler reads a one item of a given type from multiple ports. • CCR has fewer primitives than MPI but can implement MPI collectives efficiently • Use DSS(Decentralized System Services) built in terms of CCR for service model • DSS has ~35 µs and CCR a few µs overhead SALSA

  15. SALSA Messaging CCR versus MPIC# v. C v. Java

  16. Parallel Generative Topographic Mapping GTM Reduce dimensionality preserving topology and perhaps distancesHere project to 2D GTM Projection of PubChem: 10,926,94 compounds in 166 dimension binary property space takes 4 days on 8 cores. 64X64 mesh of GTM clusters interpolates PubChem. Could usefully use 1024 cores! David Wild will use for GIS style 2D browsing interface to chemistry PCA GTM GTMProjection of 2 clusters of 335 compounds in 155 dimensions Linear PCA v. nonlinear GTM on 6 Gaussians in 3D PCA is Principal Component Analysis SALSA

  17. SMACOF GTM Multidimensional Scaling MDS • Minimize Stress (X) = i<j=1nweight(i,j) (ij - d(Xi , Xj))2 • ij are input dissimilarities and d(Xi , Xj)the Euclidean distance squared in embedding space (2D here) • SMACOF or Scaling by minimizing a complicated function is clever steepest descent algorithm • Use GTM to initialize SMACOF

  18. Better ways to do this ? • Use deterministically annealed version of GTM • Do not use GTM at all but rather find clusters by DAC algorithm and then use MDS iteratively with one point (cluster center) added each iteration • and/or use Newton’s method for MDS as only thousands of parameters (# clusters times dimension l) • and/or use deterministically annealed MDS (DAMDS)(X,T) = i<j=1nweight(i,j) (d(Xi , Xj) + 2T(l+2)- ij )2 • Where T annealing temperature and l dimension of embedding space (2 in example) • d(Xi , Xj) = (Xi – Xi)2 in l dimensional latent space • ij is dissimilarity in original space

  19. Deterministically Annealed MDS (DAMDS) • (X,T) = i<j=1nweight(i,j) (d(Xi , Xj) + 2T(l+2)- ij )2 • Note that that at T=, 2T(l+2)- ij is positive and all points Xi are at origin. As T decreases, the terms with large ij become negative and associated points gradually expand from origin • “Physical Optimization”: Think of points Xi as “particles” moving under influence of forces with other points. Forces are in direction of vector between particles • Attractive: d(Xi , Xj) > ij - 2T(l+2) • Repulsive: d(Xi , Xj) < ij - 2T(l+2) • Can use iterative method based on this particle dynamics analogy and this makes (deterministic) annealing quite natural

  20. Parallel Programming Strategy “Main Thread” and Memory M MPI/CCR/DSS From other nodes MPI/CCR/DSS From other nodes Subsidiary threads t with memory mt 0 m0 1 m1 2 m2 3 m3 4 m4 5 m5 6 m6 7 m7 • Use Data Decomposition as in classic distributed memory but use shared memory for read variables. Each thread uses a “local” array for written variables to get good cache performance • Multicore and Cluster use same parallel algorithms but different runtime implementations; algorithms are • Accumulate matrix and vector elements in each process/thread • At iteration barrier, combine contributions (MPI_Reduce) • Linear Algebra (multiplication, equation solving, SVD) SALSA

  21. All parallel algorithms packaged as services and not traditional libraries • MPI-Style Micro-parallelism uses low latency CCR threads or MPI processes • CCR microseconds; local services 10’s microseconds; distributed services milliseconds • Services can be used where loose coupling natural • Input data • Algorithms • PCA • DAC GTM GM DAGM DAGTM – both for complete algorithm and for each iteration • Linear Algebra used inside or outside above • Metric embedding MDS, Bourgain, Quadratic Programming …. • HMM, SVM …. • User interface: GIS (Web map Service) or equivalent SALSA

  22. This class of data mining does/will parallelize wellon current/future multicore nodes • Severalengineeringissues for use in large applications • How to takeCCRin multicore node to cluster(MPI or cross-cluster CCR?) • Use Google MapReduce on Cloud/Grid • Needhigh performance linear algebrafor C# (PLASMA from UTenn) • Access linear algebra services in a different language? • Need equivalent of Intel C Math Librariesfor C# (vector arithmetic – level 1 BLAS) • Service modelto integrate modules • Although work used C#, similar results in C, C++, Java, Fortran • Future work is more applications; any suggestions? • Refine current algorithms such as DAGTM, SMACOF, DAMDS • New parallel algorithms • Clustering with pairwise distances but no vector spaces. Deterministic annealing here well understood but even less used • Bourgain Random Projectionfor metric embedding • Support use of Newton’sMethod (Marquardt’s method) as EM alternative • Later HMM and SVM SALSA

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