Ore's theorem

Ore's theorem is a result in graph theory proved in 1960 by Norwegian mathematician Øystein Ore. It gives a sufficient condition for a graph to be Hamiltonian, essentially stating that a graph with sufficiently many edges must contain a Hamilton cycle. Specifically, the theorem considers the sum of the degrees of pairs of non-adjacent vertices: if every such pair has a sum that at least equals the total number of vertices in the graph, then the graph is Hamiltonian.

Formal statement edit

Let $G$ be a (finite and simple) graph with $n \geq 3$ vertices. We denote by $deg v$ the degree of a vertex $v$ in $G$ , i.e. the number of incident edges in $G$ to $v$ . Then, Ore's theorem states that if

deg v + deg w \geq n

for every pair of distinct non-adjacent vertices

v

and

w

of

G

(∗)

then $G$ is Hamiltonian.

Proof edit

Illustration for the proof of Ore's theorem. In a graph with the Hamiltonian path

v 1 ... v n

but no Hamiltonian cycle, at most one of the two edges

v 1 v i

and

v i - 1 v n

(shown as blue dashed curves) can exist. For, if they both exist, then adding them to the path and removing the (red) edge

v i - 1 v i

would produce a Hamiltonian cycle.

It is equivalent to show that every non-Hamiltonian graph $G$ does not obey condition (∗). Accordingly, let $G$ be a graph on $n \geq 3$ vertices that is not Hamiltonian, and let $H$ be formed from $G$ by adding edges one at a time that do not create a Hamiltonian cycle, until no more edges can be added. Let $x$ and $y$ be any two non-adjacent vertices in $H$ . Then adding edge $xy$ to $H$ would create at least one new Hamiltonian cycle, and the edges other than $xy$ in such a cycle must form a Hamiltonian path $v 1 v 2 ... v n$ in $H$ with $x = v 1$ and $y = v n$ . For each index $i$ in the range $2 \leq i \leq n$ , consider the two possible edges in $H$ from $v 1$ to $v i$ and from $v i - 1$ to $v n$ . At most one of these two edges can be present in $H$ , for otherwise the cycle $v 1 v 2 ... v i - 1 v n v n - 1 ... v i$ would be a Hamiltonian cycle. Thus, the total number of edges incident to either $v 1$ or $v n$ is at most equal to the number of choices of $i$ , which is $n - 1$ . Therefore, $H$ does not obey property (∗), which requires that this total number of edges ( $deg v 1 + deg v n$ ) be greater than or equal to $n$ . Since the vertex degrees in $G$ are at most equal to the degrees in $H$ , it follows that $G$ also does not obey property (∗).

Algorithm edit

Palmer (1997) describes the following simple algorithm for constructing a Hamiltonian cycle in a graph meeting Ore's condition.

Arrange the vertices arbitrarily into a cycle, ignoring adjacencies in the graph.
While the cycle contains two consecutive vertices v_i and v_i + 1 that are not adjacent in the graph, perform the following two steps:
- Search for an index j such that the four vertices v_i, v_i + 1, v_j, and v_j + 1 are all distinct and such that the graph contains edges from v_i to v_j and from v_j + 1 to v_i + 1
- Reverse the part of the cycle between v_i + 1 and v_j (inclusive).

Each step increases the number of consecutive pairs in the cycle that are adjacent in the graph, by one or two pairs (depending on whether v_j and v_j + 1 are already adjacent), so the outer loop can only happen at most n times before the algorithm terminates, where n is the number of vertices in the given graph. By an argument similar to the one in the proof of the theorem, the desired index j must exist, or else the nonadjacent vertices v_i and v_i + 1 would have too small a total degree. Finding i and j, and reversing part of the cycle, can all be accomplished in time O(n). Therefore, the total time for the algorithm is O(n²), matching the number of edges in the input graph.

Related results edit

Ore's theorem is a generalization of Dirac's theorem that, when each vertex has degree at least $n /2$ , the graph is Hamiltonian. For, if a graph meets Dirac's condition, then clearly each pair of vertices has degrees adding to at least $n$ .

In turn Ore's theorem is generalized by the Bondy–Chvátal theorem. One may define a closure operation on a graph in which, whenever two nonadjacent vertices have degrees adding to at least $n$ , one adds an edge connecting them; if a graph meets the conditions of Ore's theorem, its closure is a complete graph. The Bondy–Chvátal theorem states that a graph is Hamiltonian if and only if its closure is Hamiltonian; since the complete graph is Hamiltonian, Ore's theorem is an immediate consequence.

Woodall (1972) found a version of Ore's theorem that applies to directed graphs. Suppose a digraph G has the property that, for every two vertices u and v, either there is an edge from u to v or the outdegree of u plus the indegree of v equals or exceeds the number of vertices in G. Then, according to Woodall's theorem, G contains a directed Hamiltonian cycle. Ore's theorem may be obtained from Woodall by replacing every edge in a given undirected graph by a pair of directed edges. A closely related theorem by Meyniel (1973) states that an n-vertex strongly connected digraph with the property that, for every two nonadjacent vertices u and v, the total number of edges incident to u or v is at least 2n − 1 must be Hamiltonian.

Ore's theorem may also be strengthened to give a stronger conclusion than Hamiltonicity as a consequence of the degree condition in the theorem. Specifically, every graph satisfying the conditions of Ore's theorem is either a regular complete bipartite graph or is pancyclic (Bondy 1971).

References edit

Bondy, J. A. (1971), "Pancyclic graphs I", Journal of Combinatorial Theory, Series B, 11 (1): 80–84, doi:10.1016/0095-8956(71)90016-5.
Meyniel, M. (1973), "Une condition suffisante d'existence d'un circuit hamiltonien dans un graphe orienté", Journal of Combinatorial Theory, Series B (in French), 14 (2): 137–147, doi:10.1016/0095-8956(73)90057-9.
Ore, Ø. (1960), "Note on Hamilton circuits", American Mathematical Monthly, 67 (1): 55, doi:10.2307/2308928, JSTOR 2308928.
Palmer, E. M. (1997), "The hidden algorithm of Ore's theorem on Hamiltonian cycles", Computers & Mathematics with Applications, 34 (11): 113–119, doi:10.1016/S0898-1221(97)00225-3, MR 1486890.
Woodall, D. R. (1972), "Sufficient conditions for circuits in graphs", Proceedings of the London Mathematical Society, Third Series, 24: 739–755, doi:10.1112/plms/s3-24.4.739, MR 0318000.