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Degree Sequence and Degree Set Theorem : ( Haval-Hakimi) Algorithm haval- Hakimi $2.99
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Degree Sequence and Degree Set Theorem : ( Haval-Hakimi) Algorithm haval- Hakimi

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  • May 3, 2022
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Department of Mathematics Elementary Graph Theory Lecture 10

 Degree Sequence and Degree Set

 Degree sequence
A sequence d1 , d 2 , , d p of non-negative integer is called a degree
sequence of a graph G, if the vertices of G labeled as: v1 , v2 , , v p , such
that deg(vi )  di ,  i , i  1, 2,..., p .


Ex: Find the degree sequence of the next graph:

z f
a b k



c d h
A graph G

deg(a )  2 , deg(b)  2 , deg(c)  3 , deg(d )  3 ,

deg( z )  2 , deg(h)  4 , deg( f )  1, deg(k )  1 ,

Therefore, the degree sequence of a graph G is SG : 4, 3, 3, 2, 2, 2, 1, 1

It is possible for two topologically distinct graphs to have the same degree sequence.




Two graphs with the same degree sequence

For any graph G it is easy to find its degree sequence. But an integer sequence is
not necessarily a degree sequence ( graphical sequence).



Dr. Didar A. Ali 1

, Department of Mathematics Elementary Graph Theory Lecture 10



Theorem : The following are necessary condition for a non-negative integer
sequence S : d1 , d 2 , , d p to be graphical:

p
1. The sum of the di is even number (  di  even number ).
i 1
2. di  p  1 , for 1  i  p .
3. At least two number in the sequence S are equal.



Ex: The sequence S : 3,3,3,1 satisfies all the above necessary condition, but it is
not graphical sequence.



The most important question is: Can we determine when a sequence is graphical?

The answer to our question was provided by Theorem of Haval-Hakimi.

Theorem : ( Haval-Hakimi)

A sequence S : d1 , d 2 , , dp of non-negative integers with

n  1  d1  d 2   d p  0 with p  2, d1  1 is a graphical sequence if and only if the

modified sequence S   d 2  1, d3  1, , d d1 1 , d d1 2 , , d n is graphical.


Algorithm: To test a sequence S to be Graphical Sequence. Apply the following
algorithm

1. If there exists an integer d in S such that d  p  1 , then halt and answer no.
2. If the sequence is all zeros, then halt and answer yes.
3. If the sequence contains a negative number, then halt and answer no.
4. Reorder the sequence (if necessary) so that it is non-increasing.


Dr. Didar A. Ali 2

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