I have been playing around with parallelization both using ACC and OpenMP in Fortran. I am now trying to do the same in matlab. I find it very interesting that it seems to be very hard to paralelize a loop using GPUs in matlab. Apparently the only way to do it is to by using `arrayfun`

function. But I might be wrong.

At a conceptual level, I am wondering why is the GPU usage in matlab not more straightforward than in fortran. At a more practical level, I am wondering how to use GPUs on the simple code below.

Below, I am sharing three codes and benchmarks:

- Fortran OpenMP code
- Fortran ACC code
- Matlab parfor code
- Matlab CUDA (?) this is the one I don't know how to do.

**Fortran OpenMP:**

```
program rbc
use omp_lib ! For timing
use tools
implicit none
real, parameter :: beta = 0.984, eta = 2, alpha = 0.35, delta = 0.01, &
rho = 0.95, sigma = 0.005, zmin=-0.0480384, zmax=0.0480384;
integer, parameter :: nz = 4, nk=4800;
real :: zgrid(nz), kgrid(nk), t_tran_z(nz,nz), tran_z(nz,nz);
real :: kmax, kmin, tol, dif, c(nk), r(nk), w(nk);
real, dimension(nk,nz) :: v=0., v0=0., ev=0., c0=0.;
integer :: i, iz, ik, cnt;
logical :: ind(nk);
real(kind=8) :: start, finish ! For timing
real :: tmpmax, c1
call omp_set_num_threads(12)
!Grid for productivity z
! [1 x 4] grid of values for z
call linspace(zmin,zmax,nz,zgrid)
zgrid = exp(zgrid)
! [4 x 4] Markov transition matrix of z
tran_z(1,1) = 0.996757
tran_z(1,2) = 0.00324265
tran_z(1,3) = 0
tran_z(1,4) = 0
tran_z(2,1) = 0.000385933
tran_z(2,2) = 0.998441
tran_z(2,3) = 0.00117336
tran_z(2,4) = 0
tran_z(3,1) = 0
tran_z(3,2) = 0.00117336
tran_z(3,3) = 0.998441
tran_z(3,4) = 0.000385933
tran_z(4,1) = 0
tran_z(4,2) = 0
tran_z(4,3) = 0.00324265
tran_z(4,4) = 0.996757
! Grid for capital k
kmin = 0.95*(1/(alpha*zgrid(1)))*((1/beta)-1+delta)**(1/(alpha-1));
kmax = 1.05*(1/(alpha*zgrid(nz)))*((1/beta)-1+delta)**(1/(alpha-1));
! [1 x 4800] grid of possible values of k
call linspace(kmin, kmax, nk, kgrid)
! Compute initial wealth c0(k,z)
do iz=1,nz
c0(:,iz) = zgrid(iz)*kgrid**alpha + (1-delta)*kgrid;
end do
dif = 10000
tol = 1e-8
cnt = 1
do while(dif>tol)
!$omp parallel do default(shared) private(ik,iz,i,tmpmax,c1)
do ik=1,nk;
do iz = 1,nz;
tmpmax = -huge(0.)
do i = 1,nk
c1 = c0(ik,iz) - kgrid(i)
if(c1<0) exit
c1 = c1**(1-eta)/(1-eta)+ev(i,iz)
if(tmpmax<c1) tmpmax = c1
end do
v(ik,iz) = tmpmax
end do
end do
!$omp end parallel do
ev = beta*matmul(v,tran_z)
dif = maxval(abs(v-v0))
v0 = v
if(mod(cnt,1)==0) write(*,*) cnt, ':', dif
cnt = cnt+1
end do
end program
```

**Fortran ACC:**

Just replace the mainloop syntax on the above code with:

```
do while(dif>tol)
!$acc kernels
!$acc loop gang
do ik=1,nk;
!$acc loop gang
do iz = 1,nz;
tmpmax = -huge(0.)
do i = 1,nk
c1 = c0(ik,iz) - kgrid(i)
if(c1<0) exit
c1 = c1**(1-eta)/(1-eta)+ev(i,iz)
if(tmpmax<c1) tmpmax = c1
end do
v(ik,iz) = tmpmax
end do
end do
!$acc end kernels
ev = beta*matmul(v,tran_z)
dif = maxval(abs(v-v0))
v0 = v
if(mod(cnt,1)==0) write(*,*) cnt, ':', dif
cnt = cnt+1
end do
```

**Matlab parfor:**
(I know the code below could be made faster by using vectorized syntax, but the whole point of the exercise is to compare loop speeds).

```
tic;
beta = 0.984;
eta = 2;
alpha = 0.35;
delta = 0.01;
rho = 0.95;
sigma = 0.005;
zmin=-0.0480384;
zmax=0.0480384;
nz = 4;
nk=4800;
v=zeros(nk,nz);
v0=zeros(nk,nz);
ev=zeros(nk,nz);
c0=zeros(nk,nz);
%Grid for productivity z
%[1 x 4] grid of values for z
zgrid = linspace(zmin,zmax,nz);
zgrid = exp(zgrid);
% [4 x 4] Markov transition matrix of z
tran_z(1,1) = 0.996757;
tran_z(1,2) = 0.00324265;
tran_z(1,3) = 0;
tran_z(1,4) = 0;
tran_z(2,1) = 0.000385933;
tran_z(2,2) = 0.998441;
tran_z(2,3) = 0.00117336;
tran_z(2,4) = 0;
tran_z(3,1) = 0;
tran_z(3,2) = 0.00117336;
tran_z(3,3) = 0.998441;
tran_z(3,4) = 0.000385933;
tran_z(4,1) = 0;
tran_z(4,2) = 0;
tran_z(4,3) = 0.00324265;
tran_z(4,4) = 0.996757;
% Grid for capital k
kmin = 0.95*(1/(alpha*zgrid(1)))*((1/beta)-1+delta)^(1/(alpha-1));
kmax = 1.05*(1/(alpha*zgrid(nz)))*((1/beta)-1+delta)^(1/(alpha-1));
% [1 x 4800] grid of possible values of k
kgrid = linspace(kmin, kmax, nk);
% Compute initial wealth c0(k,z)
for iz=1:nz
c0(:,iz) = zgrid(iz)*kgrid.^alpha + (1-delta)*kgrid;
end
dif = 10000;
tol = 1e-8;
cnt = 1;
while dif>tol
parfor ik=1:nk
for iz = 1:nz
tmpmax = -intmax;
for i = 1:nk
c1 = c0(ik,iz) - kgrid(i);
if (c1<0)
continue
end
c1 = c1^(1-eta)/(1-eta)+ev(i,iz);
if tmpmax<c1
tmpmax = c1;
end
end
v(ik,iz) = tmpmax;
end
end
ev = beta*v*tran_z;
dif = max(max(abs(v-v0)));
v0 = v;
if mod(cnt,1)==0
fprintf('%1.5f : %1.5f \n', [cnt dif])
end
cnt = cnt+1;
end
toc
```

**Matlab CUDA:**

This is what I have no clue how to code. Is using `arrayfun`

the only way of doing this? In fortran is so simple to move from OpenMP to OpenACC. Isn't there an easy way in Matlab of going from parfor to GPUs loops?

The time comparison between codes:

```
Fortran OpenMP: 83.1 seconds
Fortran ACC: 2.4 seconds
Matlab parfor: 1182 seconds
```

Final remark, I should say the codes above solve a simple Real Business Cycle Model and were written based on this.

`gpuArray()`

to put everything on the GPU and then use the classical vectorized syntax. Then`arrayfun`

is the more tedious alternative if you cannot write it in a vectorized manner. – Nicky Mattsson Nov 19 '18 at 12:20`for`

loop but only once with a vectorized op (which hides a loop anyway). – Brice Nov 19 '18 at 13:50