The Party Problem (Ramsey's Theorem)
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|The Party Problem|
The Party Problem
- You're going to throw a party, but haven't yet decided whom to invite. How many people do you need to invite to guarantee that at least m people will all know each other, or at least n people will all not know each other?
Basic DescriptionImagine that the next party you throw is, in secret, a mathematical experiment to find a solution to the party problem. Exhausted after planning, cooking, and setting up, you fall onto the couch and have some downtime to analyze the situation. Here is the question that we want to answer:
How many people do you need to invite to make sure that at least 3 people will be mutual friends, or at least 3 people will be mutual strangers? Because you have limited food, you want to find the fewest number of people you can invite while still satisfying these conditions.
Note: From here on out,
- blue edges will connect two vertices to represent that the people are mutual acquaintances
- red, dashed edges will connect two vertices to represent that the people are mutual strangers
A More Complicated Case
Until now, it has been relatively easy to come up with counterexamples to prove that 3, 4, or 5 people are not enough to guarantee that at least 3 people will be mutual friends or strangers. When you invite a sixth person, Fiona, it becomes a little more complicated. We can think of various cases in which 6 seems to be an answer. In the following cases, there is always a monochromatic triangle:
| To find a configuration that will not form a monochromatic triangle, try using the coloring strategy that we used for 4 and 5 people. In other words, color the outer edges blue and the inner edges red. Does this work?
|Just because there are many configurations that suggest 6 is the answer, however, doesn't prove that it is. We have to apply a more general proof to show that, no matter what, in any set of 6 people, 3 people will be mutual friends or mutual strangers. To do this, we will try to find a configuration that does not produce any monochromatic triangles, and then realize it is impossible to do so. First, let's reconfigure the vertices so that the problem is easier to model—we will only draw the edges that originate at vertex A (see left). To begin with, let's assume that all of these edges are blue. Later on, we'll see that it doesn't matter what color these edges are.|
|Remember that we are trying to find a configuration that does not produce any monochromatic triangles. Look at the triangle that would be formed by vertices A, B, and C. Since edges AB and AC are blue, we would have to make BC red to prevent triangle ABC from becoming monochromatic. Likewise, in triangle ACD, since edges AC and AD are blue, edge CD must be red.|
|Now, look at the triangle that would be formed by vertices A, B, and D. Since edges AB and AD are blue, edge BD must be red to avoid a monochromatic triangle. Even though we avoided creating a blue monochromatic triangle, we are eventually forced to form a red monochromatic triangle that has the vertices B, C, and D.|
|This holds true even if we change our initial assumption that all the edges emanating from A are blue. If edge AE were red, edge AF were red, or both edges AE and AF were red, our end results would not change. This is because these are trivial changes to the configuration. We didn't use or consider edges AE and AF when we formed the monochromatic triangle BCD, so changing their colors has no effect on triangle BCD.|
|Now what about nontrivial changes to the configuration? Say we change edge AD from blue to red. If AD isn't blue, we can no longer put a constraint on edge CD—it can be either red or blue. It is no longer guaranteed that triangle BCD is monochromatic.|
|Let's look at this new configuration again. Edges AC and AF are blue, so edge CF must be red to prevent triangle ACF from becoming a blue monochromatic triangle. Edges AB and AF are blue, so edge BF must be red to prevent triangle ABF from becoming blue and monochromatic. Sound familiar? We are, once again, forced to form a red monochromatic triangle (triangle BCF).|
|Even if we make a nontrivial change to the configuration and change edge AC from blue to red, we are still forced to form the red monochromatic triangle BEF.|
|Because we failed to find any case in which there exists no monochromatic triangle, we have proven that 6 vertices is a solution to the party problem for the following configurations: 5 blue and 0 red edges, 4 blue and 1 red edge, and 3 blue and 2 red edges. What about the other configurations? The remaining configurations are (0 blue, 5 red), (1 blue, 4 red), and (2 blue, 3 red). We can obtain the diagrams for these configurations by simply flipping the colors in the three proven configurations. For example, when the blue is replaced with red and vice-versa, the diagram for (5 blue, 0 red) becomes the diagram for (0 blue, 5 red).|
|(5 blue, 0 red) & (0 blue, 5 red)||(4 blue, 1 red) & (1 blue, 4 red)||(3 blue, 2 red) & (2 blue, 3 red)|
|Since we have demonstrated that any configuration of 6 people will always contain a monochromatic triangle, our results can be generalized to all cases.|
Finally, we've arrived at an answer to the party problem: To guarantee that at least 3 people will be mutual friends or mutual strangers, you must invite a minimum of 6 people to the party.
A More Mathematical Explanation
- Note: understanding of this explanation requires: *Graph Theory
The answer we just found is called a Ramsey number. In the simplistic terms of the party proble [...]
The answer we just found is called a Ramsey number. In the simplistic terms of the party problem, a Ramsey number R(m,n) is the minimum number of people you must invite so that at least m people will be mutual friends or at least n people will be mutual strangers. In the previous case, we proved that 6 is a Ramsey number when you want at least 3 people to be either mutual friends or mutual strangers. In other words, R(3,3) = 6.
| So how does the party problem connect to graph theory? The transition from parties to graphs is simple—in fact, we've been modeling the invited people as the vertices of a graph already. We figured out earlier that the graph must have at least 6 vertices to guarantee that either a blue, monochromatic, complete subgraph with 3 vertices or a red, monochromatic, complete subgraph with 3 vertices exists. The constraint on the number of vertices v is denoted as follows:
Since R(3,3) = 6, we can be specific and say that v ≥ 6.
| This can be taken even further and applied to any complete graph. Say you pick 2 colors, c1 and c2, and paint a graph with those colors (we previously picked blue and red). The Ramsey number is the minimum number of vertices that that graph must have to ensure that there exists either a c1-colored monochromatic, complete subgraph with at least m vertices or a c2-colored monochromatic, complete subgraph with at least n vertices:
As we will see later on, there is a Ramsey number for all complete graphs—there exists an R(3,4), R(4,4), etc.
| To put it in more formal terms, take a complete graph G with v vertices that has its edges painted in k colors. We call this a k-painting of Gv. A subgraph H of G is monochromatic if all its edges are painted with the same color. Furthermore, a complete graph with v vertices is denoted as Kv. Therefore, our previous results can be expanded as follows:
Until now, we have only considered painting graphs with 2 colors. What if we paint a graph with more than 2 colors? Can we still guarantee that monochromatic, complete subgraphs will exist in a 3-painting of a graph? In a 4-painting? The short answer is yes. Ramsey's Theorem, which generalizes the notion of Ramsey numbers, states that if you take a sufficiently large graph and paint it in any k colors, there must always exist monochromatic, complete subgraphs.
First, let's look at the case for painting with 2 colors. We previously demonstrated that R(3,3) exists. We will now prove that any R(m,n) always exists.
Lemma for Painting a Graph with 2 Colors: An integer R(m,n) exists such that any painting of KR(m,n) in 2 colors c1 and c2 contains either a Km with all its edges in c1 or a Kn with all its edges in c2.
Proof: We need to find the base case, so that we can perform induction on it. Remember the first, trivial case that we covered in the basic description? All we need to do this start from this case, because it is the most basic.
|In K2 (Fig. 5), there are 2 possible configurations. The two vertices are connected by either a c1-colored edge or a c2-colored edge. Notice that there will always be either a monochromatic c1-colored subgraph with 2 vertices, or a monochromatic c2-colored subgraph with 2 vertices. Therefore, the Ramsey number for the base case exists, and is R(2,2) = 2.|
R(2,2) is our base case. Both m = n = 2. We will perform induction on m + n = 4.
- As we just demonstrated, the Lemma holds for the base case, when m + n = 4.
- Assume that the Lemma is true when m + n < P. Now take two positive integers M and N that add up to P. If M + N = P, then M + N - 1 < P. Therefore, both R(M - 1, N) and R(M, N - 1) exist.
- Say we have a graph Kv painted in c1 and c2 colors, where v ≥ R(M - 1, N) + R(M, N - 1). To visualize this, think of a simple example: K6. Since it has 6 vertices, let's "split it up" into two graphs with 3 vertices each so that we can model v ≥ R(M - 1, N) + R(M, N - 1) as v ≥ 3 + 3:
There is a give and take between the two colors; if you have less than 3 edges of blue, you will have more than 3 edges of red, and vice versa. This means that you will always have at least 3 edges of blue or 3 edges of red.
To generalize this, if you select any vertex x, it is guaranteed that x will either lie on R(M - 1, N) edges of c1 or R(M, N - 1) edges of c2. In the former case, the vertices that are connected to x by edges colored in c1 form a subgraph KR(M - 1, N). Now let's look at this subgraph in isolation and repaint it in colors c1 and c2. Because we are assuming that the Ramsey number R(M - 1, N) exists, the subgraph contains either:
- a KM - 1 with edges colored in c1 that, together with the additional vertex x, form a KM, or
- a KN whose edges are all colored in c2.
Either way, we have demonstrated that KR(M - 1, N), and by extension Kv, contain a monochromatic subgraph in either c1 or c2.
- Therefore, by induction, we have proved that R(M,N) exists.
By proving the lemma, we have shown that monochromatic, complete subgraphs always exist in a 2-painting of Kv. In the following proof, we will generalize our results to show that monochromatic subgraphs of any shape exist in any k-painting of Kv. In other words, a Ramsey Number exists for every complete graph, regardless of the number of colors in which the graph is painted.
Theorem: G1, G2, …, Gk, are any k graphs. There exists an integer R(G1, G2, …, Gk) such that, when v ≥ R(G1, G2, …, Gk), a k-painting of Kv must contain a subgraph that is isomorphic to Gi and monochromatic in color i, for some i where 1 ≤ i ≤ k.
- This builds upon the lemma we just proved, which had limited results:
- We showed that a Ramsey number R(G1, G2) exists, where G1 and G2 are any 2 graphs.
- We tested for 2 colors, ci, where i = 1 or 2.
- As you saw in the theorem's statement, we will now expand on both of these points.
A word on notation:
- R(G1, G2, ..., Gk) is a Ramsey Number.
- If all the graphs are complete graphs, i.e. G1 = Kp1, G2 = Kp2, ..., Gk = Kpk , then R(Kp1, Kp2, ..., Kpk) is rewritten as R(p1, p2, ..., pk).
- The number of vertices in Gi is denoted as v(Gi).
Proof: Kv(Gi) is the complete graph that has the same amount of vertices as does Gi. Proving the theorem for Kv(Gi) implies the proof for Gi; all we have to do is prove this theorem for the case in which all Gi are complete graphs. To see why, say that v is large enough that a k-painted Kv contains a monochromatic Kv(Gi) in color ci:
|3-painted K7....||...contains blue monochromatic Kv(Gi).||Kv(Gi) (isomorphic to K5)|
The number of edges in Kv(Gi) is greater or equal to the number of edges in Gi:
It necessarily follows that if Kv contains a monochromatic Kv(Gi) in color ci, it will also contain a monochromatic Gi in the same color. In other words:
This is why it is sufficient to prove this theorem for the case in which all Gi are complete graphs. Now that we've established that, let's proceed with the proof:
In order to prove that R(p1, p2, ..., pk) always exists, we will perform an induction on k.
- We previously saw the proof for the basic case, k = 2, in the Lemma.
- Assume that for k < K, R(p1, p2, ..., pk) exists. Then if the integers p1, p2, ..., pK are given, R(p1, p2, ..., pK - 1) exists.
- Now suppose that v ≥ R(R(p1, p2, ..., pK-1), pK). Take any k-painting of Kv. For all edges painted in a color other than ck, assign a new color cl to form a 2-painting of Kv in cl and ck. The repainted graph must now contain either a KR(p1, p2, ..., pK-1) monochromatic in color cl or a KpK monochromatic in color cK.
- Take the former subgraph, KR(p1, p2, ..., pK-1), and look at its corresponding subgraph in the original painting (before its edges were recolored to cl). It has edges in colors c1, c2, ..., cK - 1 only. Therefore, by induction, it contains a Kpi monochromatic in color ci for some i.
It is extremely difficult to compute Ramsey numbers for increasingly larger graphs. Many of the Ramsey numbers have been determined by using exhaustive computer algorithms that compute a range of numbers, given values for m and n.
Why It's Interesting
Impossibility of Disorder
Total disorder in a graph is impossible. To extend the party metaphor, imagine that you invite more than 6 people. Regardless of how many people you invite, there will always be at least 3 people who are mutual friends or acquaintances.
Take any infinite graph you'd like. If you color it with an arbitrary, finite number of colors, there will always exist monochromatic subgraphs. So no matter how you color the graph, there will always be pockets of order.
There will always be an island of order in random, infinite chaos. Sounds quite poetic, right?
More generally: Regardless of the size of a system, if it's partitioned arbitrarily into subsystems, at least one subsystem will have a property that is shared by its constituents (monochromaticism, for example).
- There are currently no teaching materials for this page. Add teaching materials.
Ryser, Hervert John. The Carus Mathematical Monographs: Combinatorial Mathematics. Vol. Fourteen. Rahway: Quinn & Boden Company, Inc., 1963.
Wallis, W. D. A Beginner's Guide to Graph Theory. Boston: Birkhäuser, 2000.
Caldwell, Chris. "Graph Theory Glossary." Graph Theory Glossary. 19 June 2012 <http://primes.utm.edu/cgi-bin/caldwell/tutor/graph/glossary.html>.
"Ramsey's theorem." Wikipedia. 18 June 2012. 19 June 2012 <http://en.wikipedia.org/wiki/Ramsey%27s_theorem#Extensions_of_the_theorem>.
Weisstein, Eric W. "Ramsey Number." MathWorld--A Wolfram Web Resource. 19 June 2012 <http://mathworld.wolfram.com/RamseyNumber.html>.
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