cp's OEIS Frontend

From Mats Granvik, May 25 2017: (Start)

A074206(n) = A002033(n-1) = a(n) + A174726(n).

A008683(n) = a(n) - A174726(n).

Let m = size of matrix a matrix T, and let T be defined as follows:

T(n,k) = if m = 1 then 1 else if mod(n, k) = 0 then if and(n = k, n = m) then 0 else 1 else if and(n = 1, k = m) then 1 else 0

a(n) is then the number of permutation matrices with a positive contribution in the determinant of matrix T. The determinant of T is equal to the Möbius function A008683, see Mathematica program below for how to compute the determinant.

A174726 is the number of permutation matrices with a negative contribution in the determinant of matrix T.

(End)

From Gus Wiseman, Jan 04 2021: (Start)

Also the number of ordered factorizations of n into an even number of factors > 1. The non-ordered case is A339846. For example, the a(n) factorizations for n = 12, 24, 30, 32, 36 are:

(2*6) (3*8) (5*6) (4*8) (4*9)

(3*4) (4*6) (6*5) (8*4) (6*6)

(4*3) (6*4) (10*3) (16*2) (9*4)

(6*2) (8*3) (15*2) (2*16) (12*3)

(12*2) (2*15) (2*2*2*4) (18*2)

(2*12) (3*10) (2*2*4*2) (2*18)

(2*2*2*3) (2*4*2*2) (3*12)

(2*2*3*2) (4*2*2*2) (2*2*3*3)

(2*3*2*2) (2*3*2*3)

(3*2*2*2) (2*3*3*2)

(3*2*2*3)

(3*2*3*2)

(3*3*2*2)

(End)

Naturally, such a partition must have an even number of parts. Its multiplicities form a graphical partition (A000569, A320922), and vice versa.

First differs from A320911 in lacking 36.

A squarefree semiprime (A006881) is a product of any two distinct prime numbers.

The following are equivalent characteristics for any positive integer n:

(1) the prime factors of n can be partitioned into distinct strict pairs (a set of edges);

(2) n can be factored into distinct squarefree semiprimes;

(3) the prime signature of n is graphical.

These are also integer partitions that can be partitioned into not necessarily distinct edges (pairs of distinct parts). For example, (3,3,2,2) can be partitioned as {{2,3},{2,3}}, so is counted under a(10), but (4,2,2,2) and (4,2,1,1,1,1) cannot be partitioned into edges. The multiplicities of such a partition form a multigraphical partition (A209816, A320924).

An integer partition is graphical if it comprises the multiset of vertex-degrees of some graph. See A209816 for multigraphical partitions, A000070 for non-multigraphical partitions. Graphical partitions are counted by A000569.

The following are equivalent characteristics for any positive integer n:

(1) the prime indices of n can be partitioned into distinct strict pairs (a set of edges);

(2) n can be factored into distinct squarefree semiprimes;

(3) the prime signature of n is graphical.

Also the number of strict integer partitions of 2n with reverse-alternating sum >= 0.

Also the number of reversed strict integer partitions of 2n with alternating sum >= 0.

The multiplicities of such a partition form a non-loop-graphical partition (A339655, A339657).

An integer partition is graphical if it comprises the multiset of vertex-degrees of some graph. Graphical partitions are counted by A000569.

The Heinz number of an integer partition (y_1,...,y_k) is prime(y_1)*...*prime(y_k), giving a bijective correspondence between positive integers and integer partitions.

The following are equivalent characteristics for any positive integer n:

(1) the multiset of prime indices of n can be partitioned into distinct strict pairs (a set of edges);

(2) n can be factored into distinct squarefree semiprimes;

(3) the unordered prime signature of n is graphical.

The reverse-alternating sum of a partition (y_1,...,y_k) is Sum_i (-1)^(k-i) y_i. This is equal to (-1)^(r-1) times the number of odd parts, where r is the greatest part, so a(n) is the number of integer partitions of 2n with exactly two odd parts, neither of which is the greatest.

Also the number of reversed integer partitions of 2n with alternating sum -2.

The multiplicities of such a partition form a loop-graphical partition (A339656, A339658).