I am trying to solve about 1200000 linear systems (3x3, Ax=B) with CUDA 10.1, in particular using the CUBLAS library. I took a cue from this (useful!) post and re-wrote the suggested code in a Unified Memory version. The algorithm firstly performs a LU factorization using cublasgetrfBatched() followed by two consecutive invocations of cublastrsm() which solves upper or lower triangular linear systems. The code is attached below. It works correctly up to about 10000 matrixes and, in this case, it takes ~570 ms to perform the LU factorization (on an NVIDIA GeForce 930MX) and ~311 ms to solve the systems.

My issues/questions are:

Overload issue: it crashes allocating memory for more than 10k matrices. Why? How can I improve my code in order to solve the whole batch of 1.2 million matrices?

Time issue: my goal would be to solve all of these systems in less than 1 second. Am I currently following the correct approach? Any suggestions otherwise?

Would it be possible and/or useful, and if yes how, to use 'streams' of batches of 10k matrices?

**Code:**

```
#include <stdio.h>
#include <stdlib.h>
#include <string.h>
#include <assert.h>
#include <algorithm>
#include <cmath>
#include <iostream>
#include <vector>
#include <ctime>
#include <ratio>
#include <chrono>
#include <random>
#include <time.h>
#include <math.h>
// CUDA
#include <cuda.h>
#include <cuda_runtime.h>
#include "device_launch_parameters.h"
#include <cusolverDn.h>
//#include "Utilities.cuh"
using namespace std;
using namespace std::chrono;
/************************************/
/* COEFFICIENT REARRANGING FUNCTION */
/************************************/
void rearrange(double** vec, int* pivotArray, int N, int numMatrices) {
for (int nm = 0; nm < numMatrices; nm++) {
for (int i = 0; i < N; i++) {
double temp = vec[nm][i];
vec[nm][i] = vec[nm][pivotArray[N*i + nm] - 1];
vec[nm][pivotArray[N * i + nm] - 1] = temp;
}
}
}
/************************************/
/* MAIN */
/************************************/
int main() {
const int N = 3;
const int numMatrices = 10000; // I want 1200000
// random generator to fill matrices and coefficients
random_device device;
mt19937 generator(device());
uniform_real_distribution<double> distribution(1., 5.);
//ALLOCATE MEMORY - using unified memory
double** h_A;
cudaMallocManaged(&h_A, sizeof(double*) * numMatrices);
for (int nm = 0; nm < numMatrices; nm++) {
cudaMallocManaged(&(h_A[nm]), sizeof(double) * N * N);
}
double** h_b;
cudaMallocManaged(&h_b, sizeof(double*) * numMatrices);
for (int nm = 0; nm < numMatrices; nm++) {
cudaMallocManaged(&(h_b[nm]), sizeof(double) * N );
}
cout << " memory allocated" << endl;
// FILL MATRICES
for (int nm = 0; nm < numMatrices; nm++) {
for (int i = 0; i < N; i++) {
for (int j = 0; j < N; j++) {
h_A[nm][j * N + i] = distribution(generator);
}
}
}
cout << " Matrix filled " << endl;
// FILL COEFFICIENTS
for (int nm = 0; nm < numMatrices; nm++) {
for (int i = 0; i < N; i++) {
h_b[nm][i] = distribution(generator);
}
}
cout << " Coeff. vector filled " << endl;
cout << endl;
// --- CUDA solver initialization
cublasHandle_t cublas_handle;
cublasCreate_v2(&cublas_handle);
int* PivotArray;
cudaMallocManaged(&PivotArray, N * numMatrices * sizeof(int));
int* infoArray;
cudaMallocManaged(&infoArray, numMatrices * sizeof(int));
//CUBLAS LU SOLVER
high_resolution_clock::time_point t1 = high_resolution_clock::now();
cublasDgetrfBatched(cublas_handle, N, h_A, N, PivotArray, infoArray, numMatrices);
cudaDeviceSynchronize();
high_resolution_clock::time_point t2 = high_resolution_clock::now();
duration<double> time_span = duration_cast<duration<double>>(t2 - t1);
cout << "It took " << time_span.count() * 1000. << " milliseconds." << endl;
for (int i = 0; i < numMatrices; i++)
if (infoArray[i] != 0) {
fprintf(stderr, "Factorization of matrix %d Failed: Matrix may be singular\n", i);
}
// rearrange coefficient
// (temporarily on CPU, this step will be on a GPU Kernel as well)
high_resolution_clock::time_point tA = high_resolution_clock::now();
rearrange(h_b, PivotArray, N, numMatrices);
high_resolution_clock::time_point tB = high_resolution_clock::now();
duration<double> time_spanA = duration_cast<duration<double>>(tB - tA);
cout << "rearrangement took " << time_spanA.count() * 1000. << " milliseconds." << endl;
//INVERT UPPER AND LOWER TRIANGULAR MATRICES
// --- Function solves the triangular linear system with multiple right-hand sides
// --- Function overrides b as a result
const double alpha = 1.f;
high_resolution_clock::time_point t3 = high_resolution_clock::now();
cublasDtrsmBatched(cublas_handle, CUBLAS_SIDE_LEFT, CUBLAS_FILL_MODE_LOWER, CUBLAS_OP_N, CUBLAS_DIAG_UNIT, N, 1, &alpha, h_A, N, h_b, N, numMatrices);
cublasDtrsmBatched(cublas_handle, CUBLAS_SIDE_LEFT, CUBLAS_FILL_MODE_UPPER, CUBLAS_OP_N, CUBLAS_DIAG_NON_UNIT, N, 1, &alpha, h_A, N, h_b, N, numMatrices);
cudaDeviceSynchronize();
high_resolution_clock::time_point t4 = high_resolution_clock::now();
duration<double> time_span2 = duration_cast<duration<double>>(t4 - t3);
cout << "second step took " << time_span2.count() * 1000. << " milliseconds." << endl;
// --- Free resources
if (h_A) cudaFree(h_A);
if (h_b) cudaFree(h_b);
cudaDeviceReset();
return 0;
}
```