X-Git-Url: https://bilbo.iut-bm.univ-fcomte.fr/and/gitweb/book_gpu.git/blobdiff_plain/bc21a4e60ae5e4ef525ce6933905824c6597401d..9204f1de91750cacde93b719fa722d0320040454:/BookGPU/Chapters/chapter12/ch12.tex?ds=inline diff --git a/BookGPU/Chapters/chapter12/ch12.tex b/BookGPU/Chapters/chapter12/ch12.tex index eaa4f9c..3843597 100755 --- a/BookGPU/Chapters/chapter12/ch12.tex +++ b/BookGPU/Chapters/chapter12/ch12.tex @@ -5,11 +5,11 @@ %%%%%%%%%%%%%%%%%%%%%%%%%%%%%% %\chapterauthor{}{} -\chapterauthor{Lilia Ziane Khodja}{Femto-ST Institute, University of Franche-Comte, France} -\chapterauthor{Raphaël Couturier}{Femto-ST Institute, University of Franche-Comte, France} -\chapterauthor{Jacques Bahi}{Femto-ST Institute, University of Franche-Comte, France} +\chapterauthor{Lilia Ziane Khodja, Raphaël Couturier, and Jacques Bahi}{Femto-ST Institute, University of Franche-Comte, France} +%\chapterauthor{Raphaël Couturier}{Femto-ST Institute, University of Franche-Comte, France} +%\chapterauthor{Jacques Bahi}{Femto-ST Institute, University of Franche-Comte, France} -\chapter{Solving sparse linear systems with GMRES and CG methods on GPU clusters} +\chapter[Solving linear systems with GMRES and CG methods on GPU clusters]{Solving sparse linear systems with GMRES and CG methods on GPU clusters} \label{ch12} %%--------------------------%% @@ -17,32 +17,29 @@ %%--------------------------%% \section{Introduction} \label{ch12:sec:01} -The sparse linear systems are used to model many scientific and industrial problems, +Sparse linear systems are used to model many scientific and industrial problems, such as the environmental simulations or the industrial processing of the complex or non-Newtonian fluids. Moreover, the resolution of these problems often involves the -solving of such linear systems which is considered as the most expensive process in +solving of such linear systems that are considered the most expensive process in terms of execution time and memory space. Therefore, solving sparse linear systems must be as efficient as possible in order to deal with problems of ever increasing size. There are, in the jargon of numerical analysis, different methods of solving sparse -linear systems that can be classified in two classes: the direct and iterative methods. -However, the iterative methods are often more suitable than their counterpart, direct -methods, for solving these systems. Indeed, they are less memory consuming and easier +linear systems that can be classified in two classes: direct and iterative methods. +However, the iterative methods are often more suitable than their counterparts, direct +methods, to solve these systems. Indeed, they are less memory-consuming and easier to parallelize on parallel computers than direct methods. Different computing platforms, -sequential and parallel computers, are used for solving sparse linear systems with iterative -solutions. Nowadays, graphics processing units (GPUs) have become attractive for solving +sequential and parallel computers, are used to solve sparse linear systems with iterative +solutions. Nowadays, graphics processing units (GPUs) have become attractive to solve these systems, due to their computing power and their ability to compute faster than traditional CPUs. In Section~\ref{ch12:sec:02}, we describe the general principle of two well-known iterative methods: the conjugate gradient method and the generalized minimal residual method. In Section~\ref{ch12:sec:03}, we give the main key points of the parallel implementation of both methods on a cluster of -GPUs. Then, in Section~\ref{ch12:sec:04}, we present the experimental results obtained on a -CPU cluster and on a GPU cluster, for solving sparse linear systems associated to matrices -of different structures. Finally, in Section~\ref{ch12:sec:05}, we apply the hypergraph partitioning -technique to reduce the total communication volume between the computing nodes and, thus, -to improve the execution times of the parallel algorithms of both iterative methods. +GPUs. Finally, in Section~\ref{ch12:sec:04}, we present the experimental results, obtained on a +CPU cluster and on a GPU cluster of solving large sparse linear systems. %%--------------------------%% @@ -57,12 +54,12 @@ Ax=b, \label{ch12:eq:01} \end{equation} where $A\in\mathbb{R}^{n\times n}$ is a sparse nonsingular square matrix, $x\in\mathbb{R}^{n}$ -is the solution vector, $b\in\mathbb{R}^{n}$ is the right-hand side and $n\in\mathbb{N}$ is a +is the solution vector, $b\in\mathbb{R}^{n}$ is the right-hand side, and $n\in\mathbb{N}$ is a large integer number. The iterative methods\index{Iterative~method} for solving the large sparse linear system~(\ref{ch12:eq:01}) proceed by successive iterations of a same block of elementary operations, during which an -infinite number of approximate solutions $\{x_k\}_{k\geq 0}$ are computed. Indeed, from an +infinite number of approximate solutions $\{x_k\}_{k\geq 0}$ is computed. Indeed, from an initial guess $x_0$, an iterative method determines at each iteration $k>0$ an approximate solution $x_k$ which, gradually, converges to the exact solution $x^{*}$ as follows: \begin{equation} @@ -81,10 +78,10 @@ where $\varepsilon<1$ is the required convergence tolerance threshold\index{Conv Some of the most iterative methods that have proven their efficiency for solving large sparse linear systems are those called \textit{Krylov subspace methods}~\cite{ch12:ref1}\index{Iterative~method!Krylov~subspace}. -In the present chapter, we describe two Krylov methods which are widely used: the conjugate -gradient method (CG) and the generalized minimal residual method (GMRES). In practice, the -Krylov subspace methods are usually used with preconditioners that allow to improve their -convergence. So, in what follows, the CG and GMRES methods are used for solving the left-preconditioned\index{Sparse~linear~system!Preconditioned} +In the present chapter, we describe two Krylov methods which are widely used: the CG method (conjugate +gradient method) and the GMRES method (generalized minimal residual method). In practice, the +Krylov subspace methods are usually used with preconditioners that allow the improvement of their +convergence. So, in what follows, the CG and GMRES methods are used to solve the left-preconditioned\index{Sparse~linear~system!Preconditioned} sparse linear system: \begin{equation} M^{-1}Ax=M^{-1}b, @@ -97,9 +94,9 @@ where $M$ is the preconditioning matrix. %%****************%% \subsection{CG method} \label{ch12:sec:02.01} -The conjugate gradient method is initially developed by Hestenes and Stiefel in 1952~\cite{ch12:ref2}. -It is one of the well known iterative method for solving large sparse linear systems. In addition, it -can be adapted for solving nonlinear equations and optimization problems. However, it can only be applied +The conjugate gradient method was initially developed by Hestenes and Stiefel in 1952~\cite{ch12:ref2}. +It is one of the well-known iterative methods to solve large sparse linear systems. In addition, it +can be adapted to solve nonlinear equations and optimization problems. However, it can only be applied to problems with positive definite symmetric matrices. The main idea of the CG method\index{Iterative~method!CG} is the computation of a sequence of approximate @@ -114,7 +111,7 @@ such that the Galerkin condition\index{Galerkin~condition} must be satisfied: r_k \bot \mathcal{K}_k(A,r_0), \label{ch12:eq:05} \end{equation} -where $x_0$ is the initial guess, $r_k=b-Ax_k$ is the residual of the computed solution $x_k$ and $\mathcal{K}_k$ +where $x_0$ is the initial guess, $r_k=b-Ax_k$ is the residual of the computed solution $x_k$, and $\mathcal{K}_k$ the Krylov subspace of order $k$: \[\mathcal{K}_k(A,r_0) \equiv\text{span}\{r_0, Ar_0, A^2r_0,\ldots, A^{k-1}r_0\}.\] In fact, CG is based on the construction of a sequence $\{p_k\}_{k\in\mathbb{N}}$ of direction vectors in $\mathcal{K}_k$ which are pairwise $A$-conjugate ($A$-orthogonal): @@ -145,9 +142,9 @@ p_0=r_0, & p_k=r_k+\beta_k p_{k-1}, & \beta_k\in\mathbb{R}. \label{ch12:eq:09} \end{equation} Moreover, the scalars $\{\alpha_k\}_{k>0}$ are chosen so as to minimize the $A$-norm error $\|x^{*}-x_k\|_A$ -over the Krylov subspace $\mathcal{K}_{k}$ and the scalars $\{\beta_k\}_{k>0}$ are chosen so as to ensure +over the Krylov subspace $\mathcal{K}_{k}$, and the scalars $\{\beta_k\}_{k>0}$ are chosen so as to ensure that the direction vectors are pairwise $A$-conjugate. So, the assumption that matrix $A$ is symmetric and -the recurrences~(\ref{ch12:eq:08}) and~(\ref{ch12:eq:09}) allow to deduce that: +the recurrences~(\ref{ch12:eq:08}) and~(\ref{ch12:eq:09}) allow the deduction that: \begin{equation} \begin{array}{ll} \alpha_{k}=\frac{r^{T}_{k-1}r_{k-1}}{p_{k}^{T}Ap_{k}}, & \beta_{k}=\frac{r_{k}^{T}r_{k}}{r_{k-1}^{T}r_{k-1}}. @@ -179,28 +176,28 @@ the recurrences~(\ref{ch12:eq:08}) and~(\ref{ch12:eq:09}) allow to deduce that: $k = k + 1$\; } } -\caption{Left-preconditioned CG method} +\caption{left-preconditioned CG method} \label{ch12:alg:01} \end{algorithm} Algorithm~\ref{ch12:alg:01} shows the main key points of the preconditioned CG method. It allows -to solve the left-preconditioned\index{Sparse~linear~system!Preconditioned} sparse linear system~(\ref{ch12:eq:11}). +the solving the left-preconditioned\index{Sparse~linear~system!Preconditioned} sparse linear system~(\ref{ch12:eq:11}). In this algorithm, $\varepsilon$ is the convergence tolerance threshold, $maxiter$ is the maximum -number of iterations and $(\cdot,\cdot)$ defines the dot product between two vectors in $\mathbb{R}^{n}$. +number of iterations, and $(\cdot,\cdot)$ defines the dot product between two vectors in $\mathbb{R}^{n}$. At every iteration, a direction vector $p_k$ is determined, so that it is orthogonal to the preconditioned residual $z_k$ and to the direction vectors $\{p_i\}_{i1, v_k=A^{k-1}v_1, \end{equation} and \begin{equation} -V_k A = V_{k+1} \bar{H}_k. +A V_k = V_{k+1} \bar{H}_k. \label{ch12:eq:15} \end{equation} @@ -243,7 +240,7 @@ x_k = x_0 + V_k y, & y\in\mathbb{R}^{k}. \end{array} \label{ch12:eq:16} \end{equation} -From both formulas~(\ref{ch12:eq:15}) and~(\ref{ch12:eq:16}) and $r_k=b-Ax_k$, we can deduce that: +From both formulas~(\ref{ch12:eq:15}) and~(\ref{ch12:eq:16}) and $r_k=b-Ax_k$, we can deduce that \begin{equation} \begin{array}{lll} r_{k} & = & b - A (x_{0} + V_{k}y) \\ @@ -260,22 +257,23 @@ norm of the residual $r_k$. Consequently, a linear least-squares problem of size \underset{y\in\mathbb{R}^{k}}{min}\|r_{k}\|_{2}=\underset{y\in\mathbb{R}^{k}}{min}\|\beta e_{1}-\bar{H}_{k}y\|_{2}. \label{ch12:eq:18} \end{equation} -The QR factorization of matrix $\bar{H}_k$ is used to compute the solution of this problem by using -Givens rotations~\cite{ch12:ref1,ch12:ref3}, such that: +The QR factorization of matrix $\bar{H}_k$ is used (the decomposition of the matrix $\bar{H}$ into $Q$ and $R$ matrices) +to compute the solution of this problem by using +Givens rotations~\cite{ch12:ref1,ch12:ref3}, such that \begin{equation} \begin{array}{lll} \bar{H}_{k}=Q_{k}R_{k}, & Q_{k}\in\mathbb{R}^{(k+1)\times (k+1)}, & R_{k}\in\mathbb{R}^{(k+1)\times k}, \end{array} \label{ch12:eq:19} \end{equation} -where $Q_kQ_k^T=I_k$ and $R_k$ is an upper triangular matrix. +where $Q_k$ is an orthogonal matrix and $R_k$ is an upper triangular matrix. The GMRES method computes an approximate solution with a sufficient precision after, at most, $n$ iterations ($n$ is the size of the sparse linear system to be solved). However, the GMRES algorithm must construct and store in the memory an orthonormal basis $V_k$ whose size is proportional to the number of iterations required to achieve the convergence. Then, to avoid a huge memory storage, the GMRES method must be restarted at each $m$ iterations, such that $m$ is very small ($m\ll n$), and -with $x_m$ as the initial guess to the next iteration. This allows to limit the size of the basis +with $x_m$ as the initial guess to the next iteration. This allows the limitation of the size of the basis $V$ to $m$ orthogonal vectors. \begin{algorithm}[!t] @@ -295,7 +293,7 @@ $V$ to $m$ orthogonal vectors. $h_{j+1,j} = \|w_{j}\|_{2}$\; $v_{j+1} = w_{j}/h_{j+1,j}$\; } - Set $V_{m}=\{v_{j}\}_{1\leq j \leq m}$ and $\bar{H}_{m}=(h_{i,j})$ a $(m+1)\times m$ upper Hessenberg matrix\; + Set $V_{m}=\{v_{j}\}_{1\leq j \leq m}$ and $\bar{H}_{m}=(h_{i,j})$ is an upper Hessenberg matrix of size $(m+1)\times m$\; Solve a least-squares problem of size $m$: $min_{y\in\mathrm{I\!R}^{m}}\|\beta e_{1}-\bar{H}_{m}y\|_{2}$\; $x_{m} = x_{0}+V_{m}y_{m}$\; $r_{m} = M^{-1}(b-Ax_{m})$\; @@ -308,11 +306,11 @@ $V$ to $m$ orthogonal vectors. $k = k + 1$\; } } -\caption{Left-preconditioned GMRES method with restarts} +\caption{left-preconditioned GMRES method with restarts} \label{ch12:alg:02} \end{algorithm} -Algorithm~\ref{ch12:alg:02} shows the main key points of the GMRES method with restarts. +Algorithm~\ref{ch12:alg:02} shows the key points of the GMRES method with restarts. It solves the left-preconditioned\index{Sparse~linear~system!Preconditioned} sparse linear system~(\ref{ch12:eq:11}), such that $M$ is the preconditioning matrix. At each iteration $k$, GMRES uses the Arnoldi process\index{Iterative~method!Arnoldi~process} (defined from @@ -333,10 +331,10 @@ is reached. \label{ch12:sec:03} In this section, we present the parallel algorithms of both iterative CG\index{Iterative~method!CG} and GMRES\index{Iterative~method!GMRES} methods for GPU clusters. The implementation is performed on -a GPU cluster composed of different computing nodes, such that each node is a CPU core managed by a -MPI process and equipped with a GPU card. The parallelization of these algorithms is carried out by +a GPU cluster composed of different computing nodes, such that each node is a CPU core managed by one +MPI (message passing interface) process and equipped with a GPU card. The parallelization of these algorithms is carried out by using the MPI communication routines between the GPU computing nodes\index{Computing~node} and the -CUDA programming environment inside each node. In what follows, the algorithms of the iterative methods +CUDA (compute unified device architecture) programming environment inside each node. In what follows, the algorithms of the iterative methods are called iterative solvers. @@ -345,24 +343,24 @@ are called iterative solvers. \subsection{Data partitioning} \label{ch12:sec:03.01} The parallel solving of the large sparse linear system~(\ref{ch12:eq:11}) requires a data partitioning -between the computing nodes of the GPU cluster. Let $p$ denotes the number of the computing nodes on the -GPU cluster. The partitioning operation consists in the decomposition of the vectors and matrices, involved -in the iterative solver, in $p$ portions. Indeed, this operation allows to assign to each computing node +between the computing nodes of the GPU cluster. Let $p$ denote the number of the computing nodes on the +GPU cluster. The partitioning operation consists of the decomposition of the vectors and matrices, involved +in the iterative solver, in $p$ portions. Indeed, this operation allows the assignment to each computing node $i$: \begin{itemize} \item a portion of size $\frac{n}{p}$ elements of each vector, -\item a sparse rectangular sub-matrix $A_i$ of size $(\frac{n}{p},n)$ and, -\item a square preconditioning sub-matrix $M_i$ of size $(\frac{n}{p},\frac{n}{p})$, +\item a sparse rectangular submatrix $A_i$ of size $(\frac{n}{p},n)$, and +\item a square preconditioning submatrix $M_i$ of size $(\frac{n}{p},\frac{n}{p})$, \end{itemize} where $n$ is the size of the sparse linear system to be solved. In the first instance, we perform a naive -row-wise partitioning (decomposition row-by-row) on the data of the sparse linear systems to be solved. +row-wise partitioning (row-by-row decomposition) on the data of the sparse linear systems to be solved. Figure~\ref{ch12:fig:01} shows an example of a row-wise data partitioning between four computing nodes -of a sparse linear system (sparse matrix $A$, solution vector $x$ and right-hand side $b$) of size $16$ +of a sparse linear system (sparse matrix $A$, solution vector $x$, and right-hand side $b$) of size $16$ unknown values. \begin{figure} \centerline{\includegraphics[scale=0.35]{Chapters/chapter12/figures/partition}} -\caption{A data partitioning of the sparse matrix $A$, the solution vector $x$ and the right-hand side $b$ into four portions.} +\caption{A data partitioning of the sparse matrix $A$, the solution vector $x$, and the right-hand side $b$ into four portions.} \label{ch12:fig:01} \end{figure} @@ -374,17 +372,17 @@ unknown values. After the partitioning operation, all the data involved from this operation must be transferred from the CPU memories to the GPU memories, in order to be processed by GPUs. We use two functions of the CUBLAS\index{CUBLAS} library (CUDA Basic Linear -Algebra Subroutines), developed by Nvidia~\cite{ch12:ref6}: \verb+cublasAlloc()+ +Algebra Subroutines) developed by NVIDIA~\cite{ch12:ref6}: \verb+cublasAlloc()+ for the memory allocations on GPUs and \verb+cublasSetVector()+ for the memory copies from the CPUs to the GPUs. -An efficient implementation of CG and GMRES solvers on a GPU cluster requires to -determine all parts of their codes that can be executed in parallel and, thus, take +An efficient implementation of CG and GMRES solvers on a GPU cluster requires the +determining of all parts of their codes that can be executed in parallel and, thus, takes advantage of the GPU acceleration. As many Krylov subspace methods, the CG and GMRES methods are mainly based on arithmetic operations dealing with vectors or matrices: sparse matrix-vector multiplications, scalar-vector multiplications, dot products, -Euclidean norms, AXPY operations ($y\leftarrow ax+y$ where $x$ and $y$ are vectors -and $a$ is a scalar) and so on. These vector operations are often easy to parallelize +Euclidean norms, AXPY operations ($y\leftarrow ax+y$ where $x$ and $y$ are vectors and $a$ is a scalar), +and so on. These vector operations are often easy to parallelize and they are more efficient on parallel computers when they work on large vectors. Therefore, all the vector operations used in CG and GMRES solvers must be executed by the GPUs as kernels. @@ -392,41 +390,41 @@ by the GPUs as kernels. We use the kernels of the CUBLAS library to compute some vector operations of CG and GMRES solvers. The following kernels of CUBLAS (dealing with double floating point) are used: \verb+cublasDdot()+ for the dot products, \verb+cublasDnrm2()+ for the -Euclidean norms and \verb+cublasDaxpy()+ for the AXPY operations. For the rest of +Euclidean norms, and \verb+cublasDaxpy()+ for the AXPY operations ($y\leftarrow ax+y$, compute a scalar-vector product and add +the result to a vector). For the rest of the data-parallel operations, we code their kernels in CUDA. In the CG solver, we -develop a kernel for the XPAY operation ($y\leftarrow x+ay$) used at line~$12$ in +develop a kernel for the XPAY operation ($y\leftarrow x+ay$) used in line~$12$ in Algorithm~\ref{ch12:alg:01}. In the GMRES solver, we program a kernel for the scalar-vector -multiplication (lines~$7$ and~$15$ in Algorithm~\ref{ch12:alg:02}), a kernel for -solving the least-squares problem and a kernel for the elements updates of the solution +multiplication (lines~$7$ and~$15$ in Algorithm~\ref{ch12:alg:02}), a kernel to +solve the least-squares problem, and a kernel to update the elements of the solution vector $x$. The least-squares problem in the GMRES method is solved by performing a QR factorization on the Hessenberg matrix\index{Hessenberg~matrix} $\bar{H}_m$ with plane rotations and, then, solving the triangular system by backward substitutions to compute $y$. Consequently, -solving the least-squares problem on the GPU is not interesting. Indeed, the triangular +solving the least-squares problem on the GPU is not efficient. Indeed, the triangular solves are not easy to parallelize and inefficient on GPUs. However, the least-squares problem to solve in the GMRES method with restarts has, generally, a very small size $m$. -Therefore, we develop an inexpensive kernel which must be executed in sequential by a -single CUDA thread. +Therefore, we develop an inexpensive kernel which must be executed by a single CUDA thread. The most important operation in CG\index{Iterative~method!CG} and GMRES\index{Iterative~method!GMRES} -methods is the sparse matrix-vector multiplication (SpMV)\index{SpMV~multiplication}, +methods is the SpMV multiplication (sparse matrix-vector multiplication)\index{SpMV~multiplication}, because it is often an expensive operation in terms of execution time and memory space. -Moreover, it requires to take care of the storage format of the sparse matrix in the +Moreover, it requires taking care of the storage format of the sparse matrix in the memory. Indeed, the naive storage, row-by-row or column-by-column, of a sparse matrix -can cause a significant waste of memory space and execution time. In addition, the sparsity +can cause a significant waste of memory space and execution time. In addition, the sparse nature of the matrix often leads to irregular memory accesses to read the matrix nonzero -values. So, the computation of the SpMV multiplication on GPUs can involve non coalesced -accesses to the global memory, which slows down even more its performances. One of the +values. So, the computation of the SpMV multiplication on GPUs can involve noncoalesced +accesses to the global memory, which slows down its performances even more. One of the most efficient compressed storage formats\index{Compressed~storage~format} of sparse -matrices on GPUs is HYB\index{Compressed~storage~format!HYB} format~\cite{ch12:ref7}. +matrices on GPUs is the HYB (hybrid)\index{Compressed~storage~format!HYB} format~\cite{ch12:ref7}. It is a combination of ELLpack (ELL) and Coordinate (COO) formats. Indeed, it stores a typical number of nonzero values per row in ELL\index{Compressed~storage~format!ELL} -format and remaining entries of exceptional rows in COO format. It combines the efficiency +format and the remaining entries of exceptional rows in COO format. It combines the efficiency of ELL due to the regularity of its memory accesses and the flexibility of COO\index{Compressed~storage~format!COO} which is insensitive to the matrix structure. Consequently, we use the HYB kernel~\cite{ch12:ref8} -developed by Nvidia to implement the SpMV multiplication of CG and GMRES methods on GPUs. -Moreover, to avoid the non coalesced accesses to the high-latency global memory, we fill +developed by NVIDIA to implement the SpMV multiplication of CG and GMRES methods on GPUs. +Moreover, to avoid the noncoalesced accesses to the high-latency global memory, we fill the elements of the iterate vector $x$ in the cached texture memory. @@ -443,54 +441,54 @@ the cluster. In what follows, two computing nodes sharing data are called neighb As already mentioned, the most important operation of CG and GMRES methods is the SpMV multiplication. In the parallel implementation of the iterative methods, each computing node $i$ performs the -SpMV multiplication on its own sparse rectangular sub-matrix $A_i$. Locally, it has only sub-vectors -of size $\frac{n}{p}$ corresponding to rows of its sub-matrix $A_i$. However, it also requires -the vector elements of its neighbors, corresponding to the column indices on which its sub-matrix +SpMV multiplication on its own sparse rectangular submatrix $A_i$. Locally, it has only subvectors +of size $\frac{n}{p}$ corresponding to rows of its submatrix $A_i$. However, it also requires +the vector elements of its neighbors, corresponding to the column indices on which its submatrix has nonzero values (see Figure~\ref{ch12:fig:01}). So, in addition to the local vectors, each node must also manage vector elements shared with neighbors and required to compute the SpMV multiplication. Therefore, the iterate vector $x$ managed by each computing node is composed -of a local sub-vector $x^{local}$ of size $\frac{n}{p}$ and a sub-vector of shared elements $x^{shared}$. +of a local subvector $x^{local}$ of size $\frac{n}{p}$ and a subvector of shared elements $x^{shared}$. In the same way, the vector used to construct the orthonormal basis of the Krylov subspace (vectors -$p$ and $v$ in CG and GMRES methods, respectively) is composed of a local sub-vector and a shared -sub-vector. +$p$ and $v$ in CG and GMRES methods, respectively) is composed of a local subvector and a shared +subvector. Therefore, before computing the SpMV multiplication\index{SpMV~multiplication}, the neighboring nodes\index{Neighboring~node} over the GPU cluster must exchange between them the shared vector elements necessary to compute this multiplication. First, each computing node determines, in its -local sub-vector, the vector elements needed by other nodes. Then, the neighboring nodes exchange +local subvector, the vector elements needed by other nodes. Then, the neighboring nodes exchange between them these shared vector elements. The data exchanges are implemented by using the MPI point-to-point communication routines: blocking\index{MPI~subroutines!Blocking} sends with \verb+MPI_Send()+ and nonblocking\index{MPI~subroutines!Nonblocking} receives with \verb+MPI_Irecv()+. Figure~\ref{ch12:fig:02} -shows an example of data exchanges between \textit{Node 1} and its neighbors \textit{Node 0}, \textit{Node 2} +shows an example of data exchanges between \textit{Node 1} and its neighbors \textit{Node 0}, \textit{Node 2}, and \textit{Node 3}. In this example, the iterate matrix $A$ split between these four computing nodes is that presented in Figure~\ref{ch12:fig:01}. \begin{figure} \centerline{\includegraphics[scale=0.30]{Chapters/chapter12/figures/compress}} -\caption{Data exchanges between \textit{Node 1} and its neighbors \textit{Node 0}, \textit{Node 2} and \textit{Node 3}.} +\caption{Data exchanges between \textit{Node 1} and its neighbors \textit{Node 0}, \textit{Node 2}, and \textit{Node 3}.} \label{ch12:fig:02} \end{figure} After the synchronization operation, the computing nodes receive, from their respective neighbors, -the shared elements in a sub-vector stored in a compressed format. However, in order to compute the +the shared elements in a subvector stored in a compressed format. However, in order to compute the SpMV multiplication, the computing nodes operate on sparse global vectors (see Figure~\ref{ch12:fig:02}). In this case, the received vector elements must be copied to the corresponding indices in the global vector. So as not to need to perform this at each iteration, we propose to reorder the columns of -each sub-matrix $\{A_i\}_{0\leq i