RSA factoring is plain stupidly simply. Find two prime numbers that are the factors of one very large number.
For example,
16347336458092538484431338838650908598417836700330923121
81110852389333100104508151212118167511579
× 19008712816648221131268515739354139754718967899685154936
66638539088027103802104498957191261465571
= 31074182404900437213507500358885679300373460228427275457
20161948823206440518081504556346829671723286782437916272
83803341547107310850191954852900733772482278352574238645
4014691736602477652346609
So far I've explored Russian Peasant division, bit multiplication shortcutting, bit reversal with vector unit multiplication, and traditional sieving and plain bruteforce. A few years back I happened across a new method - but it was only reliable in some cases. The fantastic news is that it when it did work - it was incredibly fast. I was able to factor 384 bit numbers in a few minutes, rather than hours.
I've lost the code, but I finally remembered the basic algorithm. And it occurred to me that perhaps it was simply a rounding error in my path decision algorithm.
Anyway - my "project rotation" is upon me again, and hopefully this time I will finally succeed.
2 comments:
goodness me, u have fondness for such numbers
LOL - it's simply a challenge I really enjoy. Everyone should have an impossible, yet conceivably attainable goal - it's human ingenuity at it's finest!
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