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DPS921/Franky

Intel vTune Amplifier

Team Members

  1. Yoosuk Sim
  2. Robert Dittrich
  3. Alex Chisholm
  4. eMail All

Introduction

Intel vTune Amplifier is a performance profiler. It is specifically designed to analyze various aspect of the run-time environment and provide a snapshot of how the program performed with respect to the hardware. Some of the information include the time consumed, percentage of time used per function call, and cpu core usage. It also performs few automated analysis to suggests different ways to improve the performance, especially when using TBB.

Our project aims to leverage the power of vTune Amplifier to improve a solution to a trivial challenge.

Details

Intel vTune Amplifier is a part of the Intel Parallel Studio package as well as a standalone package. It provides a comprehensive report of resource usage by the target executable. The information of the report includes Thread usage, Memory usage, Storage usage, and other system-level resource usage. It provides useful suggestions on how how to further maximize the performance, such as increasing the grainsize or increasing the scope of data. It also provides information on how different function calls performed during run-time. This is a powerful tool to perform a data-driven system improvement. Using this tool, the developer can quickly and accurately point out the source of bottleneck and resolve it to provide an increase in scalability.

To demonstrate its usability, our team will take on a trivial challenge of finding the line-of-best-fit using linear regression method on a biased data points. We will compare a single-threaded approach, optimized using Intel DAAL, and TBB on the first code, each being analyzed by vTune to compare the performance and resource utilization.

Case-study

The test was performed over 99999999 data points with learn rate of .001 and 100 steps of gradient descent on each data point.

(i.e. $<cmd> 99999999 .001 100 )

Also, after each case, we performed an analysis using vTune Amplifier to understand the performance issues and compare them.

An example of the algorithm at work can be see here.

 

Single-thread

Single threaded approach to finding the line of best fit.

Code

#include <iostream>
#include <random>
#include <chrono>

void gradient_descent(const double x[], const double y[], const size_t& epoches, const size_t& N, const double& learn_rate, double& m, double& b) {
    double p;
    double err;
    size_t idx;
    for(size_t i = 0; i < epoches * N; i++) {
        idx = i % N;
        p = b + m * x[idx];
        err = p - y[idx];
        b = b - learn_rate * err;
        m = m - learn_rate * err * x[idx];
    }
}
int main(int argc, char* argv[]) {
    size_t N;
    double learn_rate;
    size_t epoches;
    double correct_b = 1.0;
    double correct_m = 0.5;
    if (argc != 4) {
        N = 1000;
        learn_rate = 1.0e-3;
        epoches = 5;
    } else {
        N = std::strtoul(argv[1], NULL, 10); 
        learn_rate = std::strtod(argv[2], NULL); 
        epoches = std::strtoul(argv[3], NULL,10); 
        std::cout << "N = " << N << ", learn_rate = " << learn_rate << ", epoches = " << epoches << std::endl;
    }
    std::chrono::steady_clock::time_point tStart, tStop;
    tStart = std::chrono::steady_clock::now();
    double* m_real = new double[N];
    double* b_real = new double[N];
    double* x = new double[N];
    double* y = new double[N];
    // setting up random generators
    std::default_random_engine generator;
    std::normal_distribution<double> m_dist(correct_m,0.2);
    std::normal_distribution<double> b_dist(correct_b,0.2);
    std::normal_distribution<double> x_dist(0.0,1);

    // creating random dataset
    for(size_t i = 0; i < N; i++) {
        m_real[i] = m_dist(generator);
        b_real[i] = b_dist(generator);
        x[i] = x_dist(generator);
        y[i] = m_real[i] * x[i] + b_real[i];
    }
    // estimated b, m
    double b = 0;
    double m = 0;
    // gradient descent 
    gradient_descent(x, y, epoches, N, learn_rate, m, b);
    tStop = std::chrono::steady_clock::now();
    auto ms = std::chrono::duration_cast<std::chrono::milliseconds>(tStop - tStart);
    std::cout << "Execution Time: " << ms.count() << " milliseconds" << std::endl;
    std::cout << "Predicted:\nb = " << b  << ", m = " << m << std::endl;
    std::cout << "Correct:\nb = " << correct_b  << ", m = " << correct_m << std::endl;
    std::cout << std::endl;
    delete[] m_real;
    delete[] b_real;
    delete[] x;
    delete[] y;
    return 0;
}

Performance

As expected the gradient descent function running epoches*N times would take the longest to execute. It is interesting to see std::log to have the second longest executing time. This is because when the data is being generated a random_normal function is being called and it seems like they use a lot of logarithm in it.

 

 

Optimized with DAAL

Intel has a library called the Data Analytics Acceleration Library. It is used to solve big data problems, and the library contains optimized algorithmic building blocks to efficient solutions. The library includes algorithms to solve all sorts of machine learning problems, including linear regression.

Two sets of data were generated from the serial version of the regression algorithm. The serial version was run twice, and the x[N], and y[N] arrays from the random normal number generator were written to two different csv files called test.csv, and train.csv. The x[N] and y[N] values in these two files follow a normal distribution as defined in the serial algorithm code, with N = 99,999,999.

The function called "lin_reg_norm_eq_dense_batch.cpp" in the DAAL library was manipulated to test the linear regression model. First, the function "trainModel()" is called. This function reads the "train.csv" data, and then merges the columns based on the number of independent and dependent variables, in this case it is simple regression with 1 dependent and 1 independent variable. An optimized algorithm is then initialized, training data and dependent values are passed in, and trained based on the data within the csv file. A training result is produced, which is a line of best fit model for the data. The "testModel()" function is then called, which initialized a test algorithm. The algorithm works by passing the dependent variable into the training model, and the independent values are predicted.

The model predicted y = 0.5x + 1, which matches nearly perfectly with the random data which was stored to both the train.csv, and test.csv files.


Code

/* file: lin_reg_norm_eq_dense_batch.cpp */
/*******************************************************************************
* Copyright 2014-2018 Intel Corporation.
*
* This software and the related documents are Intel copyrighted  materials,  and
* your use of  them is  governed by the  express license  under which  they were
* provided to you (License).  Unless the License provides otherwise, you may not
* use, modify, copy, publish, distribute,  disclose or transmit this software or
* the related documents without Intel's prior written permission.
*
* This software and the related documents  are provided as  is,  with no express
* or implied  warranties,  other  than those  that are  expressly stated  in the
* License.
*******************************************************************************/

/*
!  Content:
!    C++ example of multiple linear regression in the batch processing mode.
!
!    The program trains the multiple linear regression model on a training
!    datasetFileName with the normal equations method and computes regression
!    for the test data.
!******************************************************************************/

/**
* <a name="DAAL-EXAMPLE-CPP-LINEAR_REGRESSION_NORM_EQ_BATCH"></a>
* \example lin_reg_norm_eq_dense_batch.cpp
*/

#include "daal.h"
#include "service.h"

using namespace std;
using namespace daal;
using namespace daal::algorithms::linear_regression;

/* Input data set parameters */
string trainDatasetFileName = "train.csv";
string testDatasetFileName = "test.csv";

const size_t nFeatures = 1;  /* Number of features in training and testing data sets */
const size_t nDependentVariables = 1;   /* Number of dependent variables that correspond to each observation */

void trainModel();
void testModel();

training::ResultPtr trainingResult;
prediction::ResultPtr predictionResult;


int main(int argc, char *argv[])
{
	//checkArguments(argc, argv, 2, &trainDatasetFileName, &testDatasetFileName);
	
	trainModel();
	testModel();
	
	system("pause");
	return 0;
}

void trainModel()
{
	/* Initialize FileDataSource<CSVFeatureManager> to retrieve the input data from a .csv file */
	FileDataSource<CSVFeatureManager> trainDataSource(trainDatasetFileName,
		DataSource::notAllocateNumericTable,
		DataSource::doDictionaryFromContext);

	/* Create Numeric Tables for training data and dependent variables */
	NumericTablePtr trainData(new HomogenNumericTable<>(nFeatures, 0, NumericTable::doNotAllocate));
	NumericTablePtr trainDependentVariables(new HomogenNumericTable<>(nDependentVariables, 0, NumericTable::doNotAllocate));
	NumericTablePtr mergedData(new MergedNumericTable(trainData, trainDependentVariables));

	/* Retrieve the data from input file */
	trainDataSource.loadDataBlock(mergedData.get());

	/* Create an algorithm object to train the multiple linear regression model with the normal equations method */
	training::Batch<> algorithm;

	/* Pass a training data set and dependent values to the algorithm */
	algorithm.input.set(training::data, trainData);
	algorithm.input.set(training::dependentVariables, trainDependentVariables);

	/* Build the multiple linear regression model */
	algorithm.compute();

	/* Retrieve the algorithm results */
	trainingResult = algorithm.getResult();
	printNumericTable(trainingResult->get(training::model)->getBeta(), "Linear Regression coefficients:");
}

void testModel()
{

	/* Initialize FileDataSource<CSVFeatureManager> to retrieve the test data from a .csv file */
	FileDataSource<CSVFeatureManager> testDataSource(testDatasetFileName,
		DataSource::doAllocateNumericTable,
		DataSource::doDictionaryFromContext);


	/* Create Numeric Tables for testing data and ground truth values */
	NumericTablePtr testData(new HomogenNumericTable<>(nFeatures, 0, NumericTable::doNotAllocate));
	NumericTablePtr testGroundTruth(new HomogenNumericTable<>(nDependentVariables, 0, NumericTable::doNotAllocate));
	NumericTablePtr mergedData(new MergedNumericTable(testData, testGroundTruth));

	/* Load the data from the data file */
	testDataSource.loadDataBlock(mergedData.get());
	
	/* Create an algorithm object to predict values of multiple linear regression */
	prediction::Batch<> algorithm;

	/* Pass a testing data set and the trained model to the algorithm */
	algorithm.input.set(prediction::data, testData);
	algorithm.input.set(prediction::model, trainingResult->get(training::model));

	/* Predict values of multiple linear regression */
	algorithm.compute();

	/* Retrieve the algorithm results */
	predictionResult = algorithm.getResult();


	printNumericTable(predictionResult->get(prediction::prediction),
		"Linear Regression prediction results: (first 10 rows):", 10);
	printNumericTable(testGroundTruth, "Ground truth (first 10 rows):", 10);
}

Performance

 

Multi-thread

This code takes the single-threaded version above and applies TBB to leverage the power of threading to increase performance.

The single-thread logic can be broken down into reduce multi-thread logic.

Code

           
#include <iostream>
#include <random>
#include <tbb/tbb.h>

struct Para{
    double s_m;
    double s_b;
};
struct Coor{
    double s_x;
    double s_y;
};
template<typename T,typename R, typename C>
class Body{
    T m_acc;
    const R* m_coor;
    T* m_out;
    T m_i;
    C m_c;

    public:

    Body(T* out,R* co, T i, C c): m_acc(i),m_coor(co), m_out(out), m_i(i), m_c(c) {}
    T get_accumul() const { return m_acc; }

        void operator()(tbb::blocked_range<std::size_t>& r){
            T temp = m_acc;
            for (std::size_t i = r.begin(); i != r.end(); i++)
                temp = m_c(temp, m_out[i],m_coor[i]);
            m_acc = temp;
        }
    template<typename Tag>
        void operator()(tbb::blocked_range<std::size_t>& r, Tag){
            T temp = m_acc;
            for (std::size_t i = r.begin(); i != r.end(); i++){
                temp = m_c(temp, m_out[i],m_coor[i]);
                if (Tag::is_final_scan()){
                    m_out[i] = temp;
                }
            }
            m_acc = temp;
        }
    Body(Body& b, tbb::split) : m_acc(b.m_i), m_coor(b.m_coor), m_out(b.m_out), m_i(b.m_i), m_c(b.m_c){}
    void reverse_join(Body& a){
        m_acc.s_m = (m_acc.s_m + a.m_acc.s_m)/2;
        m_acc.s_b = (m_acc.s_b + a.m_acc.s_b)/2;
    }
    void join(Body& a){
        m_acc.s_m = (m_acc.s_m + a.m_acc.s_m)/2;
        m_acc.s_b = (m_acc.s_b + a.m_acc.s_b)/2;
    }
    void assign(Body& b) { m_acc = b.m_acc ; }
};

template<typename T,typename R, typename C>
T scan( T* out, R* co, std::size_t n, T identity, C combine){
    Body<T,R,C> body(out, co, identity, combine);
    tbb::parallel_reduce ( tbb::blocked_range<std::size_t>(0,n,5000), body );
    return body.get_accumul();
}


int main(int argc, char* argv[]) {
    std::size_t N;
    double learn_rate;
    std::size_t epoches;
    if (argc != 4) {
        N = 1000;
        learn_rate = 1.0e-3;
        epoches = 5;
    } else {
        N = std::strtoul(argv[1], NULL, 10); 
        learn_rate = std::strtod(argv[2], NULL); 
        epoches = std::strtoul(argv[3], NULL,10); 
        std::cout << "N = " << N << ", learn_rate = " << learn_rate << ", epoches" << epoches << std::endl;
    }

    // creating random dataset
    Coor* c = new Coor[N]; /* coordinates */
    double* m_real = new double[N];
    double* b_real = new double[N];

    std::default_random_engine generator;
    std::normal_distribution<double> m_dist(0.5,0.2);
    std::normal_distribution<double> b_dist(1.0,0.2);
    std::normal_distribution<double> x_dist(0.0,1);
    for(std::size_t i = 0; i < N; i++) {
        m_real[i] = m_dist(generator);
        b_real[i] = b_dist(generator);
        c[i].s_x = x_dist(generator);
        c[i].s_y = m_real[i] * c[i].s_x + b_real[i];
    }

    Para* a = new Para[N]; /* parameters */

    auto calc = [&](Para& temp, Para& a, const Coor& c )  {
        double p = temp.s_b + temp.s_m * c.s_x;
        double err = p - c.s_y;
        a.s_b = temp.s_b - learn_rate * err;
        a.s_m = temp.s_m - learn_rate * err * c.s_x;
        return a;
    };

    Para final;
    for(std::size_t i = 0 ; i < epoches ; i++){
        final = scan(a,c,N,final,calc);
    }
    std::cout << "b = " << a[N-1].s_b  << ", m = " << a[N-1].s_m << std::endl;
    delete [] m_real;
    delete [] b_real;
    delete [] a;
    delete [] c;
    return 0;
}

Performance

While much of the process are now using multithreading, there are still a good chunk of the code using serial region. Let's try to fix that.

 

Fix

Processes generating random numbers for our starting data points are taking up some time in the serial region. The random number generator uses a for-loop. Let's apply OpenMP worksharing to make it more efficient

#pragma omp parallel for
    for(std::size_t i = 0; i < N; i++) {
        m_real[i] = m_dist(generator);
        b_real[i] = b_dist(generator);
        c[i].s_x = x_dist(generator);
        c[i].s_y = m_real[i] * c[i].s_x + b_real[i];
    }

Performance

vTune Amplifier now shows more percentage of run-time utilizing multiple cores.

 

Source

  1. Intel vTune Amplifier Homepage
  2. Parallel_reduce()
  3. Linear Regression In C++
  4. Linear Regression Algorithms from Intel DAAL Library
  5. Github repository of the code used