Abstract
We introduce the endomorphism distinguishing number De(G) of a graph G as the least cardinal d such that G has a vertex coloring with d colors that is only preserved by the trivial endomorphism. This generalizes the notion of the distinguishing number D(G) of a graph G, which is defined for automorphisms instead of endomorphisms.
As the number of endomorphisms can vastly exceed the number of automorphisms, the new concept opens challenging problems, several of which are presented here. In particular, we investigate relationships between De(G) and the endomorphism motion of a graph G, that is, the least possible number of vertices moved by a nontrivial endomorphism of G. Moreover, we extend numerous results about the distinguishing number of finite and infinite graphs to the endomorphism distinguishing number.
As the number of endomorphisms can vastly exceed the number of automorphisms, the new concept opens challenging problems, several of which are presented here. In particular, we investigate relationships between De(G) and the endomorphism motion of a graph G, that is, the least possible number of vertices moved by a nontrivial endomorphism of G. Moreover, we extend numerous results about the distinguishing number of finite and infinite graphs to the endomorphism distinguishing number.
| Original language | English |
|---|---|
| Article number | P1.16 |
| Number of pages | 13 |
| Journal | The Electronic Journal of Combinatorics |
| Volume | 21 |
| Issue number | 1 |
| DOIs | |
| Publication status | Published - 2014 |
Fields of Expertise
- Sonstiges