I need to solve polynomials in finite prime fields on 16-bit CPUs. I have seen people using the fields `GF((2^16)+1), GF((2^16)-15)`

, and `GF((2^32)-5)`

. I guess these choices stem from the fact that there are several optimizations. However, apart from using "mod" I do not know any further optimizations. I would really appreciate if someone pointed me to a good resource, gave me code snippets, or explained why people are using those strange prime numbers instead of say `GF((2^16)-1)`

.

EDIT: %-free modulo in GF((2^16)+1):

```
uint32_t mod_0x10001(uint32_t divident)
{
uint16_t least;
uint16_t most;
least = divident & 0xFFFF;
most = divident >> 16;
if (least >= most) {
return least - most;
} else {
return 0x10001 + least - most;
}
}
```

EDIT: %-free modulo in GF(2^16-15):

```
uint32_t mod_0xFFF1(uint32_t divident)
{
uint16_t least;
uint16_t most;
uint32_t remainder;
least = divident & 0xFFFF;
most = divident >> 16;
/**
* divident mod 2^16-15
* = (most * 2^N + least) mod 2^16-15
* = [(most * 2^N mod 2^16-15) + (least mod 2^16-15)] mod 2^16-15
* = [ 15 * most + least ] mod 2^16-15
*/
remainder = 15 * most + least;
while (remainder >= 0xFFF1) {
remainder -= 0xFFF1;
}
return remainder;
}
```

UPDATE: I measured the performonce on an MSP430: the upper version is 4 times faster than the lower version. The lower version is as fast as simply using % :/. Any further suggestions to speed up the lower version?

Cheers Konrad

`2^16 - 1`

isn't a prime power, so that's out. The others are primes close to powers of 2. – Daniel Fischer Mar 19 '13 at 14:19