Below is a benchmark to test the various methods discussed so far. I'm using the TIMEIT function found on the File Exchange.

```
function [t,v] = testClampColumns()
% data and limits ranges for each column
r = 10000; c = 500;
M = randn(r,c);
mn = -1.1 * ones(1,c);
mx = +1.1 * ones(1,c);
% functions
f = { ...
@() clamp1(M,mn,mx) ;
@() clamp2(M,mn,mx) ;
@() clamp3(M,mn,mx) ;
@() clamp4(M,mn,mx) ;
@() clamp5(M,mn,mx) ;
};
% timeit and check results
t = cellfun(@timeit, f, 'UniformOutput',true);
v = cellfun(@feval, f, 'UniformOutput',false);
assert(isequal(v{:}))
end
```

Given the following implementations:

### 1) loop over all values and compare against min/max

```
function M = clamp1(M, mn, mx)
for j=1:size(M,2)
for i=1:size(M,1)
if M(i,j) > mx(j)
M(i,j) = mx(j);
elseif M(i,j) < mn(j)
M(i,j) = mn(j);
end
end
end
end
```

### 2) compare each column against min/max

```
function M = clamp2(M, mn, mx)
for j=1:size(M,2)
M(M(:,j) < mn(j), j) = mn(j);
M(M(:,j) > mx(j), j) = mx(j);
end
end
```

### 3) truncate each columns to limits

```
function M = clamp3(M, mn, mx)
for j=1:size(M,2)
M(:,j) = min(max(M(:,j), mn(j)), mx(j));
end
end
```

### 4) vectorized version of truncation in (3)

```
function M = clamp4(M, mn, mx)
M = bsxfun(@min, bsxfun(@max, M, mn), mx);
end
```

### 5) absolute value comparison: -a < x < a <==> |x| < a

(Note: this is not applicable to your case, since it requires a symmetric limits range. I only included this for completeness. Besides it turns out to be the slowest method.)

```
function M = clamp5(M, mn, mx)
assert(isequal(-mn,mx), 'Only works when -mn==mx')
idx = bsxfun(@gt, abs(M), mx);
v = bsxfun(@times, sign(M), mx);
M(idx) = v(idx);
end
```

The timing I get on my machine with an input matrix of size 10000x500:

```
>> t = testClampColumns
t =
0.2424
0.1267
0.0569
0.0409
0.2868
```

I would say that all the above methods are acceptably fast enough, with the `bsxfun`

solution being the fastest :)