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Partial sums of A122836 (number of topologies on n labeled elements in which at least one element belongs to some pair of noncomparable members of the topology).
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%I #12 Dec 26 2022 11:31:51

%S 0,0,0,10,253,6384,208887,9673189,651633791,63901292323,9040801794022,

%T 1825884406581355,521181413335003984,208402574279716434454,

%U 115825454535371969786250,88852094572776191675804592

%N Partial sums of A122836 (number of topologies on n labeled elements in which at least one element belongs to some pair of noncomparable members of the topology).

%C All listed (the first 16) values are nonprimes. In the underlying sequence, only A122836(5) = 6131 is prime of the listed values.

%F a(n) = Sum_{i=0..n} A122836(i) = Sum_{i=0..n} (A000798(i) - A122835(i)) = (Sum_{i=0..n} A000798(i)) - (Sum_{i=0..n} A122835(i)).

%e a(4) = 0 + 0 + 0 + 10 + 243 = 253 = 11 * 23.

%Y Cf. A000798, A122835, A122836.

%K nonn

%O 0,4

%A _Jonathan Vos Post_, Dec 25 2010

%E a(13)-a(15) corrected by _Georg Fischer_, Dec 26 2022