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Unlike the connected case (A057500), these graphs may have more than one cycle; for example, the graph {{1,2},{1,3},{1,4},{2,3},{2,4},{5,6}} has multiple cycles.

a(n) is the number of pseudotrees on n nodes. - Eric W. Weisstein, Jun 11 2012

Also unlabeled connected graphs covering n vertices with at most n edges. For this definition we have a(1) = 0 and possibly a(0) = 0. - Gus Wiseman, Feb 20 2024

These are the connected graphs that are neither trees nor unicyclic.

Also connected non-choosable graphs covering n vertices, where a graph is choosable iff it is possible to choose a different vertex from each edge. The unlabeled version is A140636. The complement is counted by A129271. - Gus Wiseman, Feb 20 2024

See A088956 for the definition of the hyperbinomial transform.

a(n) is the number of partial functions on {1,2,...,n} that are endofunctions with no cycles of length > 1. The triangle A088956 classifies these functions according to the number of undefined elements in the domain. The triangle A144289 classifies these functions according to the number of edges in their digraph representation (considering the empty function to have 1 edge). The triangle A203092 classifies these functions according to the number of connected components. - Geoffrey Critzer, Dec 29 2011

a(n) is the number of rooted subtrees (for a fixed root) in the complete graph on n+1 vertices: a(3) = 29 is the number of rooted subtrees in K_4: 1 of size 1, 3 of size 2, 9 of size 3, and 16 spanning subtrees. - Alex Chin, Jul 25 2013 [corrected by Marko Riedel, Mar 31 2019]

From Gus Wiseman, Jan 28 2024: (Start)

Also the number of labeled loop-graphs on n vertices such that it is possible to choose a different vertex from each edge in exactly one way. For example, the a(3) = 29 uniquely choosable loop-graphs (loops shown as singletons) are:

{} {1} {1,2} {1,12} {1,2,13} {1,12,13}

{2} {1,3} {1,13} {1,2,23} {1,12,23}

{3} {2,3} {2,12} {1,3,12} {1,13,23}

{2,23} {1,3,23} {2,12,13}

{3,13} {2,3,12} {2,12,23}

{3,23} {2,3,13} {2,13,23}

{1,2,3} {3,12,13}

{3,12,23}

{3,13,23}

(End)

Number of n x n binary matrices without zero rows and with distinct rows up to permutation of rows, cf. A014070.

Row 0 of square array A136555.

From Gus Wiseman, Dec 19 2023: (Start)

Also the number of n-element sets of nonempty subsets of {1..n}, or set-systems with n vertices and n edges (not necessarily covering). The covering case is A054780. For example, the a(3) = 35 set-systems are:

{1}{2}{3} {1}{2}{12} {1}{2}{123} {1}{12}{123} {12}{13}{123}

{1}{2}{13} {1}{3}{123} {1}{13}{123} {12}{23}{123}

{1}{2}{23} {1}{12}{13} {1}{23}{123} {13}{23}{123}

{1}{3}{12} {1}{12}{23} {2}{12}{123}

{1}{3}{13} {1}{13}{23} {2}{13}{123}

{1}{3}{23} {2}{3}{123} {2}{23}{123}

{2}{3}{12} {2}{12}{13} {3}{12}{123}

{2}{3}{13} {2}{12}{23} {3}{13}{123}

{2}{3}{23} {2}{13}{23} {3}{23}{123}

{3}{12}{13} {12}{13}{23}

{3}{12}{23}

{3}{13}{23}

Of these, only {{1},{2},{1,2}}, {{1},{3},{1,3}}, and {{2},{3},{2,3}} do not cover the vertex set.

(End)

It doesn't matter for this sequence whether we use loops such as {x,x} or half-loops such as {x}.

These are loop-graphs where every connected component has a number of edges less than or equal to the number of vertices. Also loop-graphs with at most one cycle (unicyclic) in each connected component.

It is observed by Gus Wiseman in A368596 and A368730 that this sequence appears to be the complement of those sequences. If this is the case, then a(n) is the number of labeled graphs with loops allowed in which each connected component has an equal number of vertices and edges and the conjectured formula holds. Terms for n >= 9 are expected to be 167341283, 4191140394, 116425416531, ... - Andrew Howroyd, Jan 10 2024

From Gus Wiseman, Mar 22 2024: (Start)

An equivalent conjecture is that a(n) is the number of loop-graphs with n vertices and n edges such that it is possible to choose a different vertex from each edge. I call these graphs choosable. For example, the a(3) = 17 choosable loop-graphs are the following (loops shown as singletons):

{{1},{2},{3}} {{1},{2},{1,3}} {{1},{1,2},{1,3}} {{1,2},{1,3},{2,3}}

{{1},{2},{2,3}} {{1},{1,2},{2,3}}

{{1},{3},{1,2}} {{1},{1,3},{2,3}}

{{1},{3},{2,3}} {{2},{1,2},{1,3}}

{{2},{3},{1,2}} {{2},{1,2},{2,3}}

{{2},{3},{1,3}} {{2},{1,3},{2,3}}

{{3},{1,2},{1,3}}

{{3},{1,2},{2,3}}

{{3},{1,3},{2,3}}

(End)

The axiom of choice says that, given any set of nonempty sets Y, it is possible to choose a set containing an element from each. The strict version requires this set to have the same cardinality as Y, meaning no element is chosen more than once.