For any set $X$ we let $[X]^2 = \big\{\{x, y\}: x\neq y \in X\big\}$. Consider the following statement:
(S) : If $G =(V,E)$ is a simple, undirected graph such that $E \neq [X]^2$, then there is $e^* \in [X]^2 \setminus E$ such that $G \not \cong (V, E\cup\{e^*\})$.
For finite graphs, (S) is true since adding any edge changes the degree sequence. Does (S) hold for infinite graphs as well?
No - for a countexample, take the disjoint union of all possible finite graphs, each repeated countably many times.
There is a similar counterexample even if we ask that the graph be connected - just add all possible edges between vertices from different 'copies'.
For a connected counterexample you could take the Rado graph (https://en.wikipedia.org/wiki/Rado_graph). It shouldn't be too hard to prove that when you add an edge, the resulting graph will still satisfy the extension property, which characterizes the Rado graph.
