Let X be a negative binomial random variable of parameters r,p, then X=Y_1+Y_2+…+Y_r, where Y_j , j=1,…,r are geometric random.variables of parameter p. Show that: P(X>k) le rP(Y1>k/r)

Gisselle Hodges

Gisselle Hodges

Answered question

2022-10-28

How to prove inequality between probabilities of negative-binomial random variable and geometric variable?
Let X be a negative binomial random variable of parameters r, p, then X = Y 1 + Y 2 + + Y r , where Y j , j = 1 , , r are geometric random.variables of parameter p. Show that: P ( X > k ) r P ( Y 1 > k / r )

Answer & Explanation

Jean Deleon

Jean Deleon

Beginner2022-10-29Added 14 answers

Step 1
The proposed inequality is true in general (continuous as well as discrete, bounded support or unbounded), not just for the nice and well-known examples of NegativeBinomial (sum of Geometric), Binomial (sum of Bernoulli), or Gamma (sum of exponential) etc.
Rewrite the left hand side as P { X > k } = 1 P { X k } = 1 P { ( i = 1 r Y i ) k }   .
Then, note that the event ( i = 1 r Y i ) k behaves as if it is a union that contains the intersection of the individual events i = 1 r ( Y i k r ) . To be convinced of this fact, please consider the events Y 1 + Y 2 2 versus Y 1 1 Y 2 1.
Step 2
Geometrically, one can view this as the simplex solid being larger than the cube. For example, with all Y i being non-negative, the simplex solid Y 1 + Y 2 + Y 3 3 clearly contains the entirety of the unit cube Y 1 1 Y 2 1 Y 3 1.
Therefore P { X > k } = 1 P { ( i = 1 r Y i ) k } larger event 1 P { i = 1 r ( Y i k r ) } smaller event = P { [ i = 1 r ( Y i k r ) ] c } = P { i = 1 r ( Y i > k r ) }   .
Now, the probability of the union is smaller than the sum of the probabilities, by Boole's inequality, also known as Bonferroni inequality:
P { i = 1 r ( Y i > k r ) } i = 1 r P { Y i > k r } = r P { Y 1 > k r }
which is the right hand side.
Both "simplex versus hypercube" and Bonferroni inequality are very loose, so the overall inequality is very loose.

Do you have a similar question?

Recalculate according to your conditions!

New Questions in High school geometry

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?