Minimum length of an interval containing n twin primes.
2, 8, 20, 32, 38, 50, 62, 86, 104, 134, 146, 170, 182, 212, 224, 254
1
The length is the difference of beginning of the first pair to the end of the last pair.
Terms from Jens Kruse Andersen. - T. D. Noe, Jun 27 2014
T. D. Noe, Plot of 16 terms
Thomas R. Nicely, Dense prime clusters (results obtained by other researchers)
Examples:
Two twin primes in an interval of length 8: 11, 13 to 17, 19.
Three twin primes in an interval of length 20: 11, 13 to 29, 31.
Cf. A007530 (first number of a pair of twin primes differing by 6).
Cf. S000067, S000068, S000069, S000070 (3 to 6 twin primes), S000073, S000074 (other definitions).
nonn,more,hard,nice
T. D. Noe, Jun 27 2014