I have currently engaged a total power of 460000Mkeys/s.
#110 I have at the moment [DP Count 2^26.87 / 2^27.55]
The Pollard's kangaroo ECDLP solver needs on average about 2*(2^(109/2)) = 2^55.5 steps to retrieve this private key, with a total power of 460000Mkeys/s = 2^38.8 steps/sec it would take 2^16.7 seconds, about 30 hours.
With the same power, for the key #115 (114 bit) it would take 2^19.2 seconds, about 170 hours (7 days).
Thank you very much for the specific (as always) conversion of your power into the required time to solve :-)
This is really huge power! ) Is it like 300-400 cards Tesla V100 / GTX 2080ti ?
That's right ... It's the result of combining the power of Tesla V100 and 2080Ti.
wow, 460000Mkeys/s, really ? #110 should be solved tomorrow...
If I really get the solution after reaching 2^27.55 - it will actually happen tomorrow.
At the moment I am on level 2^27.03
Jean_Luc in earlier posts I read that the mechanism that proposes the best DP value to perform the selected task requires refinement, yes?
My question is:
what DP value will best be used for #115 for V100 and 2080Ti cards?
I have ~400GB RAM and 2TB of disk space available