Use `bsxfun`

for vectorization

```
f1 = @(a,b) (abs((a.*exp(-0.1*b*2.5)).^0.9)+0.0);
f2 = @(c,d) kr0*exp(0.8*c*0.1).*d;
pol = bsxfun(f2, permute(1:2, [3 1 2]), bsxfun(f1, I(:), 1:46));
```

Note that since array `1:2`

is on third dimension we need `permute`

to convert a matrix of size `1x2`

to a matrix of size `1x1x2`

.

Here is a benchmark for comparision

```
kr0=1;
I=rand(5440,1);
[pol0, pol] = deal(zeros(5440, 46, 2));
tic
for mm = 1:10,
for i=1:5440
for j=1:46
for k= 1:2
pol0(i,j,k)= kr0*exp(0.8*k*0.1)*(abs((I(i)*exp(-0.1*j*2.5))^0.9)+0.0);
end
end
end
end
toc
tic
for mm=1:10
f1 = @(a,b) (abs((a.*exp(-0.1*b*2.5)).^0.9)+0.0);
f2 = @(c,d) kr0*exp(0.8*c*0.1).*d;
pol = bsxfun(f2, permute(1:2, [3 1 2]), bsxfun(f1, I(:), 1:46));
end
toc
isequal(pol0,pol)
```

Which returns

```
Elapsed time is 1.665443 seconds.
Elapsed time is 0.306089 seconds.
ans =
1
```

It is more than 5 times faster and the results are equal.

`pol`

will help.`pol=zeros(5440,46,2);`

– Guddu Sep 13 '13 at 9:07