Chromatic Polynomial: Determine Pk(G) for Graph

  • Thread starter intelli
  • Start date
  • Tags
    Polynomial
In summary, as a scientist, your response to the forum post would likely include an explanation of the concept of chromatic polynomials and their purpose in graph theory. You would also describe the steps you took to determine the chromatic polynomial for the given graph, including any equations or theorems used, and provide a visual representation of the graph and coloring scheme used to demonstrate the correctness of your solution. Finally, you would conclude by summarizing your findings and providing a clear answer to the question posed in the forum post.
  • #1
intelli
20
0

Homework Statement


Determining the chromatic polynomial Pk(G) for following graph




Homework Equations





The Attempt at a Solution



I did the solution in the picture so i get k and k-1 the colors should not be same as adjacent so that sounds like 2 colors is that all i need to prove??
 

Attachments

  • solution1.png
    solution1.png
    504 bytes · Views: 347
Physics news on Phys.org
  • #2


your response to this forum post would likely include a more detailed explanation of your solution. You could start by explaining the concept of a chromatic polynomial and its purpose in graph theory. Then, you could describe the steps you took to determine the chromatic polynomial for the given graph, including any equations or theorems you used. Additionally, it would be helpful to provide a visual representation of the graph and the coloring scheme you used to demonstrate the correctness of your solution. Finally, you could conclude by summarizing your findings and providing a clear answer to the question posed in the forum post.
 

FAQ: Chromatic Polynomial: Determine Pk(G) for Graph

What is a chromatic polynomial?

A chromatic polynomial is a mathematical function that assigns a value to a graph based on the number of ways it can be colored with a given number of colors without any adjacent vertices having the same color.

How is the chromatic polynomial calculated?

The chromatic polynomial, denoted as Pk(G), is calculated by using a recursive formula that takes into account the number of vertices, edges, and connected components in a graph. It can also be calculated using the principle of inclusion-exclusion.

What is the significance of Pk(G) in graph theory?

The value of Pk(G) provides important information about the graph, such as the number of possible colorings and the chromatic number (minimum number of colors needed to color the graph without any adjacent vertices having the same color). It also has applications in other areas of mathematics, such as knot theory and statistical mechanics.

How does the value of Pk(G) change with different values of k?

The value of Pk(G) changes depending on the number of colors, k, being used. As k increases, the value of Pk(G) also increases. In some cases, Pk(G) may have multiple real roots, which can provide insight into the structure of the graph.

Can Pk(G) be calculated for any type of graph?

Yes, Pk(G) can be calculated for any type of graph, including directed and undirected graphs, simple and multigraphs, and planar and non-planar graphs. However, the calculation method may differ slightly depending on the type of graph.

Back
Top