I want to get exp() of a large matrix (A) with values that repeat at different indices. To speed-up the exp() operation I only perform it on the unique values of A and then reassemble the matrix. However the reassembly of the matrix is quite slow. The following code provides a working example:

```
% defintion of a grid
gridSp = 5:5:35*5;
X = repmat(gridSp,35,1);
Z = repmat(gridSp',1,35);
% calculation of the distances
locMat = [X(:) Z(:)];
dist=sqrt(bsxfun(@minus,locMat(:,1),locMat(:,1)').^2 +...
bsxfun(@minus,locMat(:,2),locMat(:,2)').^2);
sizeDist = size(dist);
uniqueDist = unique(dist,'stable');
[~, Locb] = ismember(dist,uniqueDist);
nn_A = exp(1i*2*pi*rand(sizeDist(1),100));
H_A = zeros(size(nn_A));
freq = linspace(10^-3,10,100);
psdA = 4096*length(freq).*10.*4.*22.6./((1 + 6.*freq*22.6).^(5/3));
for jj=1:100
b = exp(-8.8*uniqueDist*sqrt((freq(jj)/15).^2 + 10^-7));
b = b.*psdA(jj);
A = b(Locb);
droptol = max(A(:))*10^-10;
if min(A(:))<droptol
A = sparse(A);
HH_A = ichol(A,struct('type','ict','shape','lower','droptol',droptol));
else
HH_A = chol(A,'lower');
end
H_A(:,jj) = HH_A*nn_A(:,jj);
end
```

Especially the reassembly of the matrix

```
A = b(Locb);
```

and the conversion of the matrix to sparse

```
A = sparse(A);
```

in the last for-loop take up a lot of time. Is there a quicker way to do this? Interestingly:

```
B = A + A;
```

is much faster than

```
A = b(Locb);
```

I have to perfom these operations far more often than the 100 iterations in the example.

Here a condensed version of the code up on request (below).

```
% defintion of a grid
gridSp = 5:5:28*5;
X = repmat(gridSp,35,1);
Z = repmat(gridSp',1,35);
% calculation of the distances
locMat = [X(:) Z(:)];
dist=sqrt(bsxfun(@minus,locMat(:,1),locMat(:,1)').^2 +bsxfun(@minus,locMat(:,2),locMat(:,2)').^2);
uniqueDist = unique(dist,'stable');
[~, Locb] = ismember(dist,uniqueDist);
for jj=1:100
b = exp(jj.*uniqueDist);
A = b(Locb);
end
```

`exp`

-and-reassembly is the bottleneck? And if yes, can you provide shorter code only with that part? – Luis Mendo Sep 2 '15 at 21:35`dist*sqrt((freq(jj)/15).^2 + 10^-7)`

assumes values of up to 160, but`exp(-8.8*x)`

suffers numerical underflow starting from values of`x`

as low as 85. Resulting matrices are only sparse because of this underflow. – A. Donda Sep 7 '15 at 1:50