All Questions
Tagged with enumerative-combinatorics graph-theory
10 questions
23
votes
3
answers
3k
views
Proofs of parity results via the Handshaking lemma
I particularly like the following strategy to prove that the number of some combinatorial objects is even: to construct a graph, in which they correspond to vertices of odd degree (=valency).
Let me ...
10
votes
1
answer
7k
views
Counting non-isomorphic graphs with prescribed number of edges and vertices
I'd love your help with this question.
Let $n\geq3$ be a fixed integer. How many non-isomorphic graphs with $p$ vertices and $q$ edges are there where $p+q=n$?
Thank you very much.
Crossposted at ...
- 101
7
votes
2
answers
480
views
Are all numbers from $1$ to $n!$ the number of perfect matchings of some bipartite graph?
Let $f(G)$ give the number of perfect matchings of a graph $G$.
Consider set $\mathcal N_{2n}=\{0,1,2,\dots,n!-1,n!\}$.
Consider collection of all $2n$ vertex balanced bipartite graph to be $\...
- 13.9k
5
votes
1
answer
650
views
Counting Problems where Labeled is Known but Unlabeled is Not
Cayley's formula states that the number of labeled trees on $n$ vertices is $n^{n-2}$. There are many nice proofs of this compact formula.
To contrast, counting unlabeled trees is considerably harder....
- 51
19
votes
3
answers
2k
views
A generalization of the triangle counting problem for simple weighted graphs
One nice identity is that $$\operatorname{tr}(A^3)/6$$ counts the number of triangles of a graph with adjacency matrix $A$. It also implies that triangle counting in a graph can be performed in sub-...
- 3,463
14
votes
5
answers
4k
views
Are there more connected or disconnected graphs on $n$ vertices?
Suppose we are talking about graphs with $n$ labeled vertices. Which graphs are more common: connected or disconnected?
- 1,765
8
votes
2
answers
2k
views
The number of Dyck paths of length $2n$ and height exactly $k$
In A080936 gives the number of Dyck paths of length $2n$ and height exactly $k$ and has a little more information on the generating functions.
For all $n\geq 1$ and $\frac{(n+1)}{2}\leq k\leq n$ we ...
- 355
7
votes
0
answers
355
views
How does the number of self-avoiding paths between two points scale, in a square/cubic lattice?
Consider two different infinite graphs, whose vertices are drawn from $\mathbb Z^2$ or $\mathbb Z^3$. Let $P_d : \mathbb Z^d \times \mathbb N \to \mathbb N$ for $d \in \{2,3\}$ be the function such ...
- 1,414
6
votes
2
answers
7k
views
How many perfect matchings in a regular bipartite graph?
We have a $d$-regular bipartite graph $G = (X,Y,E)$ with $|X| = |Y| = n$ and $|E| = nd$.
What is an upper bound on the number of perfect matchings of $G$?
- 61
6
votes
1
answer
748
views
Enumeration of graphs with a given and bounded degree sequence
What is the best known asymptotic formula for the number of graphs with a given degree sequence $(d_1, ... ,d_n)$, when the degrees are bounded by a constant and the number of vertices $n$ goes to ...
- 1,633