Top person sorted by score
| The Prover-Account Top 20 | |||
|---|---|---|---|
| Persons by: | number | score | normalized score |
| Programs by: | number | score | normalized score |
| Projects by: | number | score | normalized score |
At this site we keep several lists of primes, most notably the list of the 5,000 largest known primes. Who found the most of these record primes? We keep separate counts for persons, projects and programs. To see these lists click on 'number' to the right.
Clearly one 100,000,000 digit prime is much harder to discover than quite a few 100,000 digit primes. Based on the usual estimates we score the top persons, provers and projects by adding (log n)3 log log n for each of their primes n. Click on 'score' to see these lists.
Finally, to make sense of the score values, we normalize them by dividing by the current score of the 5000th prime. See these by clicking on 'normalized score' in the table on the right.
rank person primes score 921 Adam Sutton 1 45.6121 922 Andreas Adolfsson 1 45.6045 923 Stephen Kohlman 1 45.5941 924 Marian Otremba 1 45.5844 925 Manuel G. 1 45.5822 926 Stephen Hou 1 45.5800 927 Olaf Eiterig 1 45.5744 928 Pierre Cami 1 45.5718 929 Dirk Verhaagen 1 45.5695 930 Mario Löbmann 1 45.5638 931 Matej Rizman 1 45.5618 932 Arnaud de Klerk 1 45.5607 933 Lennart Vogel 1 45.5579 934 Japke Rosink 1 45.5511 935 Peter Crickman 1 45.5485 936 James Majors 1 45.5442 937 Marcel Out 1 45.5437 938 Jean Schmalen 1 45.5408 939 Jiri Kolencik 1 45.5361 940 Grant Busler 1 45.5356
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Notes:
- Score for Primes
To find the score for a person, program or project's primes, we give each prime n the score (log n)3 log log n; and then find the sum of the scores of their primes. For persons (and for projects), if three go together to find the prime, each gets one-third of the score. Finally we take the log of the resulting sum to narrow the range of the resulting scores. (Throughout this page log is the natural logarithm.)
How did we settle on (log n)3 log log n? For most of the primes on the list the primality testing algorithms take roughly O(log(n)) steps where the steps each take a set number of multiplications. FFT multiplications take about
O( log n . log log n . log log log n )
operations. However, for practical purposes the O(log log log n) is a constant for this range number (it is the precision of numbers used during the FFT, 64 bits suffices for numbers under about 2,000,000 digits).
Next, by the prime number theorem, the number of integers we must test before finding a prime the size of n is O(log n) (only the constant is effected by prescreening using trial division). So to get a rough estimate of the amount of time to find a prime the size of n, we just multiply these together and we get
O( (log n)3 log log n ).
Finally, for convenience when we add these scores, we take the log of the result. This is because log n is roughly 2.3 times the number of digits in the prime n, so (log n)3 is quite large for many of the primes on the list. (The number of decimal digits in n is floor((log n)/(log 10)+1)).