01204211/homework9 graph theory 2

This is part of 01204211-58

Due: 18 Dec 2015

H.1 (LPV-7.3.9) Prove that at least one of ${\displaystyle G}$ and ${\displaystyle {\bar {G}}}$ is connected. (Note that ${\displaystyle {\bar {G}}}$ is a complement graph of ${\displaystyle G}$.)

H.2 TBA There is no problem H.2. Please skip this problem.

H.3 (LPV-8.3.2) How many labeled trees on n nodes are stars? How many are paths?

H.4 (LPV-8.5.4) Prove that if a tree has a node of degree d, then it has at least d leaves.

H.5 (LPV-10.3.1) In class, we proved the Hall's marriage theorem. In this problem, you will show that if a bipartite graph ${\displaystyle G=(A\cup B,E)}$ satisfies the condition that every node has the same degree ${\displaystyle d\geq 1}$, the ${\displaystyle G}$ has a perfect matching.

(Hint: first prove that (1) ${\displaystyle |A|=|B|}$, and (2) for any subset ${\displaystyle X\subseteq A}$ of size ${\displaystyle k}$, the number of nodes in ${\displaystyle B}$ that are connected to some node in ${\displaystyle X}$ is at least ${\displaystyle k}$, then apply the Hall's theorem.)

H.6 (LPV-10.4.9) Let G be a bipartite graph with m nodes on both sides. Prove that if each node has degree larger than m/2, then it has a perfect matching.

(Hint: prove that G is good. Is is possible to find a subset of nodes on the left side that violates condition (2) for the Hall's marriage theorem?)