Description
- Recall that the handshaking lemma says that the total degree of a loopless graph πΊ is twice the number of edges. Also recall that ππ has 2π vertices (each binary π-tuple is a vertex) and that ππ is π-regular.Β How many edges does ππ have?
- Explain why a nontrivial simple finite graph cannot have a walk of maximum length, but it must have a path of maximum length.
- A trail is a walk that does not repeat an edge. Prove that a trail that repeats a vertex must contain a cycle.Β (Think about the set of nontrivial sub-walks along the trail that start and end at the same vertex.)
- Here are two 3-regular graphs, both with six vertices and nine edges. If they are isomorphic, give an explicit isomorphism π:ππΊ β ππ».Β If they are not isomorphic, provide a convincing argument for this fact (for instance, point out a structural feature of one that is not shared by the other.)
- Below is depicted a graph πΊ constructed by joining two opposite vertices of πΆ12. Some authors call this a βtheta graphβ because it resembles the Greek letter π.
- What is the total degree of this graph?
- What are the possible total degrees of graphs obtained by deleting a vertex of πΊ?
- What are the possible total degrees of graphs obtained by contracting an edge of πΊ?
- What are the possible total degrees of graphs obtained by identifying two vertices of πΊ?