The number of edges of a graph.

The degree of the graph. This is the maximal vertex degree of a graph.

The chromatic index of a graph. This is the minimal number of colours needed such that no two adjacent edges have the same colour.

The number of leaves in a graph. That is, the number of vertices of a graph that have degree 1.

The number of positive eigenvalues of the Laplacian matrix of the graph. This is the number of vertices minus the number of connected components of the graph.

The Hamming dimension of a graph. Let $H(n, k)$ be the graph whose vertices are the subsets of $\{1,\dots,n\}$, and $(u,v)$ being an edge, for $u\neq v$, if the symmetric difference of $u$ and $v$ has cardinality at most $k$. This statistic is the smallest $n$ such that the graph is an induced subgraph of $H(n, k)$ for some $k$.

The number of bridges of a graph. A bridge is an edge whose removal increases the number of connected components of the graph.

The number of pairs of vertices of different degree in a graph.

The maximal number of leaves on a vertex of a graph.

The number of different adjacency matrices of a graph. This is the number of different labellings of the graph, or $\frac{|G|!}{|\operatorname{Aut}(G)|}$.