For MathLink - based functions, you will have to do two things (On Windows): use `MLAbort`

to check for aborts, and call `MLCallYieldFunction`

, to yield the processor temporarily. Both are described in the MathLink tutorial by Todd Gayley from way back, available here.

Using the bits from my previous answer, here is an example code to compute the prime numbers (in an inefficient manner, but this is what we need here for an illustration):

```
code =
"
#include <stdlib.h>
extern void primes(int n);
static void yield(){
MLCallYieldFunction(
MLYieldFunction(stdlink),
stdlink,
(MLYieldParameters)0 );
}
static void abort(){
MLPutFunction(stdlink,\" Abort \",0);
}
void primes(int n){
int i = 0, j=0,prime = 1, *d = (int *)malloc(n*sizeof(int)),ctr = 0;
if(!d) {
abort();
return;
}
for(i=2;!MLAbort && i<=n;i++){
j=2;
prime = 1;
while (!MLAbort && j*j <=i){
if(i % j == 0){
prime = 0;
break;
}
j++;
}
if(prime) d[ctr++] = i;
yield();
}
if(MLAbort){
abort();
goto R1;
}
MLPutFunction(stdlink,\"List\",ctr);
for(i=0; !MLAbort && i < ctr; i++ ){
MLPutInteger(stdlink,d[i]);
yield();
}
if(MLAbort) abort();
R1: free(d);
}
";
```

and the template:

```
template =
"
void primes P((int ));
:Begin:
:Function: primes
:Pattern: primes[n_Integer]
:Arguments: { n }
:ArgumentTypes: { Integer }
:ReturnType: Manual
:End:
";
```

Here is the code to create the program (taken from the previous answer, slightly modified):

```
Needs["CCompilerDriver`"];
fullCCode = makeMLinkCodeF[code];
projectDir = "C:\\Temp\\MLProject1";
If[! FileExistsQ[projectDir], CreateDirectory[projectDir]]
pname = "primes";
files = MapThread[
Export[FileNameJoin[{projectDir, pname <> #2}], #1,
"String"] &, {{fullCCode, template}, {".c", ".tm"}}];
```

Now, here we create it:

```
In[461]:= exe=CreateExecutable[files,pname];
Install[exe]
Out[462]= LinkObject["C:\Users\Archie\AppData\Roaming\Mathematica\SystemFiles\LibraryResources\
Windows-x86-64\primes.exe",161,10]
```

and use it:

```
In[464]:= primes[20]
Out[464]= {2,3,5,7,11,13,17,19}
In[465]:= primes[10000000]
Out[465]= $Aborted
```

In the latter case, I used Alt+"." to abort the computation. Note that this won't work correctly if you do not include a call to `yield`

.

The general ideology is that you have to check for `MLAbort`

and call `MLCallYieldFunction`

for every expensive computation, such as large loops etc. Perhaps, doing that for inner loops like I did above is an overkill though. One thing you could try doing is to factor the boilerplate code away by using the C preprocessor (macros).