# problem to determine the chromatic polynomial of a graph

for a homework graph theory, I'm asked to determine the chromatic polynomial of the following graph

For the Descomposition Theorem of Chromatic Polynomials. if G=(V,E), is a connected graph and e belong E

``````P (G, λ) = P (Ge, λ) -P(Ge', λ)
``````

where Ge denotes de subgraph obtained by deleting de edge e from G (Ge= G-e) and Ge' is the subgraph obtained by identifying the vertices {a,b} = e

When calculating chromatic Polynomials, i shall place brackets about a graph to indicate its chromatic polynomial. removes an edge any of the original graph to calculate the chromatic polynomial by the method of decomposition.

`````` P (G, λ) = P (Ge, λ)-P (Ge', λ) = λ (λ-1)^4 - [λ(λ-1)*(λ^2 - 3λ + 3)]
``````

But the response from the answer key and the teacher is:

``````P (G, λ) = λ (λ-1)(λ-2)(λ^2-2λ-2)
``````

I have operated on the polynomial but I can not reach the solution that I ask .. what am I doing wrong?

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Interesting problem but i think you might do better with getting an answer at: cstheory.stackexchange.com or math.stackexchange.com –  Paul Sasik Apr 20 '11 at 0:14
yeah but in both pages i can't post any images because im new user. –  franvergara66 Apr 20 '11 at 0:17
Go ahead and open new questions on both sites and i'll edit the questions for you with the images as they are here. Reply here, of course, so I know when the Qs are ready. –  Paul Sasik Apr 20 '11 at 0:31
Sounds like you got a great answer. And a good idea to link back to SO for the original question with images. So you're good to go? –  Paul Sasik Apr 20 '11 at 2:13

math.stackexchange.com told me as a way to solve my problem. Here's the solution:

http://math.stackexchange.com/questions/33946/problem-to-determine-the-chromatic-polynomial-of-a-graph

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Your answer is correct, and so is the teacher's --they are equal. [By the way, nice picture and explanation.]

An odd-cycle can have no 2-coloring, hence the 5-cycle can have no 2-coloring, so its chromatic polynomial, f(x), must have x * [x - 1] * [x - 2]

as a divisor. If you combine your expression for f(x) and divide out the

``````x * [x - 1]
``````

then you'll find that what remains is divisible by [x - 2], and the quotient is what your teacher wrote. -Jonathan King

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