{
"cells": [
{
"cell_type": "markdown",
"id": "46d0dd15",
"metadata": {},
"source": [
"![](\"https://upload.wikimedia.org/wikipedia/commons/thumb/3/39/VU_logo.png/800px-VU_logo.png?20161029201021\")
\n",
"\n",
"### Programming large-scale parallel systems\n",
"\n",
"# Gaussian elimination"
]
},
{
"cell_type": "markdown",
"id": "ff0fbd76",
"metadata": {},
"source": [
"## Contents\n",
"\n",
"In this notebook, we will learn\n",
"\n",
"- How to parallelize Gaussian elimination\n",
"- How to fix static load imbalance"
]
},
{
"cell_type": "markdown",
"id": "8dcee319",
"metadata": {},
"source": [
"## Gaussian elimination\n",
"\n",
"\n",
"System of linear algebraic equations\n",
"\n",
"$$\n",
"\\left[\n",
"\\begin{matrix}\n",
"1 & 3 & 1 \\\\\n",
"1 & 2 & -1 \\\\\n",
"3 & 11 & 5 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"\\left[\n",
"\\begin{matrix}\n",
"x \\\\\n",
"y \\\\\n",
"z \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"=\n",
"\\left[\n",
"\\begin{matrix}\n",
"9 \\\\\n",
"1 \\\\\n",
"35 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"$$\n",
"\n",
"Elimination steps\n",
"\n",
"\n",
"$$\n",
"\\left[\n",
"\\begin{matrix}\n",
"1 & 3 & 1 & 9 \\\\\n",
"1 & 2 & -1 & 1 \\\\\n",
"3 & 11 & 5 & 35 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"\\rightarrow\n",
"\\left[\n",
"\\begin{matrix}\n",
"1 & 3 & 1 & 9 \\\\\n",
"0 & -1 & -2 & -8 \\\\\n",
"0 & 2 & 2 & 8 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"\\rightarrow\n",
"\\left[\n",
"\\begin{matrix}\n",
"1 & 3 & 1 & 9 \\\\\n",
"0 & 1 & 2 & 8 \\\\\n",
"0 & 2 & 2 & 8 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"\\rightarrow\n",
"\\left[\n",
"\\begin{matrix}\n",
"1 & 3 & 1 & 9 \\\\\n",
"0 & 1 & 2 & 8 \\\\\n",
"0 & 0 & -2 & -8 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"\\rightarrow\n",
"\\left[\n",
"\\begin{matrix}\n",
"1 & 3 & 1 & 9 \\\\\n",
"0 & 1 & 2 & 8 \\\\\n",
"0 & 0 & 1 & 4 \\\\\n",
"\\end{matrix}\n",
"\\right]\n",
"$$\n",
"\n"
]
},
{
"cell_type": "markdown",
"id": "94c10106",
"metadata": {},
"source": [
"### Serial implementation\n"
]
},
{
"cell_type": "code",
"execution_count": null,
"id": "e4070214",
"metadata": {},
"outputs": [],
"source": [
"function gaussian_elimination!(B)\n",
" n,m = size(B)\n",
" @inbounds for k in 1:n\n",
" for t in (k+1):m\n",
" B[k,t] = B[k,t]/B[k,k]\n",
" end\n",
" B[k,k] = 1\n",
" for i in (k+1):n \n",
" for j in (k+1):m\n",
" B[i,j] = B[i,j] - B[i,k]*B[k,j]\n",
" end\n",
" B[i,k] = 0\n",
" end\n",
" end\n",
" B\n",
"end"
]
},
{
"cell_type": "code",
"execution_count": null,
"id": "eb30df0d",
"metadata": {},
"outputs": [],
"source": [
"A = Float64[1 3 1; 1 2 -1; 3 11 5]\n",
"b = Float64[9,1,35]\n",
"B = [A b]\n",
"gaussian_elimination!(B)"
]
},
{
"cell_type": "markdown",
"id": "39f2e8ef",
"metadata": {},
"source": [
"## Parallelization\n"
]
},
{
"cell_type": "markdown",
"id": "1b1a6469",
"metadata": {},
"source": [
"### Where can we extract parallelism?\n",
"\n",
"```julia\n",
"n,m = size(B)\n",
"for k in 1:n\n",
" for t in (k+1):m\n",
" B[k,t] = B[k,t]/B[k,k]\n",
" end\n",
" B[k,k] = 1\n",
" for i in (k+1):n \n",
" for j in (k+1):m\n",
" B[i,j] = B[i,j] - B[i,k]*B[k,j]\n",
" end\n",
" B[i,k] = 0\n",
" end\n",
"end\n",
"```"
]
},
{
"cell_type": "markdown",
"id": "14d57c52",
"metadata": {},
"source": [
"### Two possible data partitions"
]
},
{
"attachments": {
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"
}
},
"cell_type": "markdown",
"id": "f06f0869",
"metadata": {},
"source": [
"\n",
"
![](\"attachment:g23933.png\")
\n",
"
\n",
"
![](\"attachment:g26595.png\")
\n",
"
\n",
"
\n",
"
\n",
"
\n",
"
\n",
"
"
]
},
{
"attachments": {
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"
}
},
"cell_type": "markdown",
"id": "0d80cd72",
"metadata": {},
"source": [
"\n",
"
![](\"attachment:g26786.png\")
\n",
"
![](\"attachment:g27009.png\")
\n",
""
]
},
{
"cell_type": "markdown",
"id": "20982b04",
"metadata": {},
"source": [
"## Exercise\n",
"\n",
"- The actual parallel implementation is let as an exercise\n",
"- Implement both 1d block and 1d cyclic partitions and compare performance\n",
"- Closely related with Floyd's algorithm\n",
"- Generate input matrix with function below (a random matrix is not enough, we need a non singular matrix that does not require pivoting)"
]
},
{
"cell_type": "code",
"execution_count": null,
"id": "a65cf8e6",
"metadata": {},
"outputs": [],
"source": [
"function tridiagonal_matrix(n)\n",
" C = zeros(n,n)\n",
" stencil = [(-1,2,-1),(-1,0,1)]\n",
" for i in 1:n\n",
" for (coeff,o) in zip((-1,2,-1),(-1,0,1))\n",
" j = i+o\n",
" if j in 1:n\n",
" C[i,j] = coeff\n",
" end\n",
" end\n",
" end\n",
" C\n",
"end"
]
},
{
"cell_type": "code",
"execution_count": null,
"id": "31d8586a",
"metadata": {},
"outputs": [],
"source": [
"n = 5\n",
"C = tridiagonal_matrix(n)\n",
"b = ones(n)\n",
"gaussian_elimination!(C)"
]
}
],
"metadata": {
"kernelspec": {
"display_name": "Julia 1.9.0",
"language": "julia",
"name": "julia-1.9"
},
"language_info": {
"file_extension": ".jl",
"mimetype": "application/julia",
"name": "julia",
"version": "1.9.0"
}
},
"nbformat": 4,
"nbformat_minor": 5
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