20171212, 11:32  #1 
"Adolf"
Nov 2013
South Africa
61 Posts 
Fermat ECM
Just more of a curiosity.
I have 4 computers doing ECM on Fermat numbers. Usually they are assigned F21 or F22 ECM work. The one now was assigned F18. Any reason? 
20171213, 03:25  #2  
1976 Toyota Corona years forever!
"Wayne"
Nov 2006
Saskatchewan, Canada
5×19×47 Posts 
Quote:
It seems the server likes to mix up your workload a bit based on the amount of RAM you have on your user preferences. If you give it a lot less (maybe about 200 or 300M) you will get assignments more in the F12F15 range but on the other hand this little RAM will slow down the processing. 

20171213, 08:22  #3 
Romulan Interpreter
Jun 2011
Thailand
10001011100100_{2} Posts 
Note that the "chain" is "inclusive", in the sense that when you test for a factor of F22, you also test for factors of the smaller F21, F20, etc. That is because \(F_{n+1}=(F_n1)^2+1\) and to test if some q divides \(F_n\), you repeatedly square 2 and test if it is 1 (mod q). You can fall on 1 earlier than n iterations, therefore finding a factor for a smaller Fermat number. All factors are \(q=k*2^{n+2}+1\) so factors of larger F will "fit" for smaller F too with a larger k (double, quadruple, 8 times, etc). So, technically, if you look for a factor of F22, you may find a factor of F21, or F18, etc, "accidentally".
For example, you want to see if 641 is a factor of F7 (this is a stupid example, as 641 is 640+1=5*128+1=5*2^7+1, so it can only be a factor to F5 maximum (5=72), even if we would not know anything about it, we would not test it if it is a factor of F7, but well, it will suffice for the current example). Then we would have to square 2 (mod 641) a number of 7 times, to see if 2^2^7 is 1. Code:
gp > a=Mod(2,641) Mod(2, 641) gp > a=a^2 Mod(4, 641) gp > a=a^2 Mod(16, 641) gp > a=a^2 Mod(256, 641) gp > a=a^2 Mod(154, 641) gp > a=a^2 Mod(640, 641) gp > A better example would be, assume we want to check if 2424833 is a factor of F14. This can be a factor of F14, because 2424833 =37*2^16+1 the power of 2 is at least 16=14+2. So: Code:
gp > q=37*2^16+1 2424833 gp > a=Mod(2,q) Mod(2, 2424833) gp > a=a^2 Mod(4, 2424833) gp > a=a^2 Mod(16, 2424833) gp > a=a^2 Mod(256, 2424833) gp > a=a^2 Mod(65536, 2424833) gp > a=a^2 Mod(588053, 2424833) gp > a=a^2 Mod(896679, 2424833) gp > a=a^2 Mod(2253235, 2424833) gp > a=a^2 Mod(1126485, 2424833) gp > a=a^2 Mod(2424832, 2424833) gp > It is as simple as that. Last fiddled with by LaurV on 20171213 at 08:29 
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