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Geometric distribution

In probability theory and statistics, the geometric distribution is either one of two discrete probability distributions:

  • The probability distribution of the number of Bernoulli trials needed to get one success, supported on ;
  • The probability distribution of the number of failures before the first success, supported on .
Geometric
Probability mass function
Cumulative distribution function
Parameters success probability (real) success probability (real)
Support k trials where k failures where
PMF
CDF for ,
for
for ,
for
Mean
Median


(not unique if is an integer)


(not unique if is an integer)
Mode
Variance
Skewness
Excess kurtosis
Entropy
MGF
for

for
CF
PGF
Fisher information

These two different geometric distributions should not be confused with each other. Often, the name shifted geometric distribution is adopted for the former one (distribution of ); however, to avoid ambiguity, it is considered wise to indicate which is intended, by mentioning the support explicitly.

The geometric distribution gives the probability that the first occurrence of success requires independent trials, each with success probability . If the probability of success on each trial is , then the probability that the -th trial is the first success is

for

The above form of the geometric distribution is used for modeling the number of trials up to and including the first success. By contrast, the following form of the geometric distribution is used for modeling the number of failures until the first success:

for

The geometric distribution gets its name because its probabilities follow a geometric sequence. It is sometimes called the Furry distribution after Wendell H. Furry.[1]: 210 

Definition

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The geometric distribution is the discrete probability distribution that describes when the first success in an infinite sequence of independent and identically distributed Bernoulli trials occurs. Its probability mass function depends on its parameterization and support. When supported on  , the probability mass function is where   is the number of trials and   is the probability of success in each trial.[2]: 260–261 

The support may also be  , defining  . This alters the probability mass function into where   is the number of failures before the first success.[3]: 66 

An alternative parameterization of the distribution gives the probability mass function where   and  .[1]: 208–209 

An example of a geometric distribution arises from rolling a six-sided die until a "1" appears. Each roll is independent with a   chance of success. The number of rolls needed follows a geometric distribution with  .

Properties

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Memorylessness

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The geometric distribution is the only memoryless discrete probability distribution.[4] It is the discrete version of the same property found in the exponential distribution.[1]: 228  The property asserts that the number of previously failed trials does not affect the number of future trials needed for a success.

Because there are two definitions of the geometric distribution, there are also two definitions of memorylessness for discrete random variables.[5] Expressed in terms of conditional probability, the two definitions are 

and 

where   and   are natural numbers,   is a geometrically distributed random variable defined over  , and   is a geometrically distributed random variable defined over  . Note that these definitions are not equivalent for discrete random variables;   does not satisfy the first equation and   does not satisfy the second.

Moments and cumulants

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The expected value and variance of a geometrically distributed random variable   defined over   is[2]: 261   With a geometrically distributed random variable   defined over  , the expected value changes into while the variance stays the same.[6]: 114–115 

For example, when rolling a six-sided die until landing on a "1", the average number of rolls needed is   and the average number of failures is  .

The moment generating function of the geometric distribution when defined over   and   respectively is[7][6]: 114  The moments for the number of failures before the first success are given by

 

where   is the polylogarithm function.[8]

The cumulant generating function of the geometric distribution defined over   is[1]: 216   The cumulants   satisfy the recursion where  , when defined over  .[1]: 216 

Proof of expected value

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Consider the expected value   of X as above, i.e. the average number of trials until a success. On the first trial, we either succeed with probability  , or we fail with probability  . If we fail the remaining mean number of trials until a success is identical to the original mean. This follows from the fact that all trials are independent. From this we get the formula:

 

which, if solved for  , gives:[citation needed]

 

The expected number of failures   can be found from the linearity of expectation,  . It can also be shown in the following way:[citation needed]

 

The interchange of summation and differentiation is justified by the fact that convergent power series converge uniformly on compact subsets of the set of points where they converge.

Summary statistics

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The mean of the geometric distribution is its expected value which is, as previously discussed in § Moments and cumulants,   or   when defined over   or   respectively.

The median of the geometric distribution is  when defined over  [9] and   when defined over  .[3]: 69 

The mode of the geometric distribution is the first value in the support set. This is 1 when defined over   and 0 when defined over  .[3]: 69 

The skewness of the geometric distribution is  .[6]: 115 

The kurtosis of the geometric distribution is  .[6]: 115  The excess kurtosis of a distribution is the difference between its kurtosis and the kurtosis of a normal distribution,  .[10]: 217  Therefore, the excess kurtosis of the geometric distribution is  . Since  , the excess kurtosis is always positive so the distribution is leptokurtic.[3]: 69  In other words, the tail of a geometric distribution decays faster than a Gaussian.[10]: 217 

Entropy and Fisher's Information

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Entropy (Geometric Distribution, Failures Before Success)

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Entropy is a measure of uncertainty in a probability distribution. For the geometric distribution that models the number of failures before the first success, the probability mass function is:

 

The entropy   for this distribution is defined as:

 

The entropy increases as the probability   decreases, reflecting greater uncertainty as success becomes rarer.

Fisher's Information (Geometric Distribution, Failures Before Success)

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Fisher information measures the amount of information that an observable random variable   carries about an unknown parameter  . For the geometric distribution (failures before the first success), the Fisher information with respect to   is given by:

 

Proof:

  • The Likelihood Function for a geometric random variable   is:
 
  • The Log-Likelihood Function is:
 
  • The Score Function (first derivative of the log-likelihood w.r.t.  ) is:
 
  • The second derivative of the log-likelihood function is:
 
  • Fisher Information is calculated as the negative expected value of the second derivative:
 

Fisher information increases as   decreases, indicating that rarer successes provide more information about the parameter  .

Entropy (Geometric Distribution, Trials Until Success)

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For the geometric distribution modeling the number of trials until the first success, the probability mass function is:

 

The entropy   for this distribution is given by:

 

Entropy increases as   decreases, reflecting greater uncertainty as the probability of success in each trial becomes smaller.

Fisher's Information (Geometric Distribution, Trials Until Success)

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Fisher information for the geometric distribution modeling the number of trials until the first success is given by:

 

Proof:

  • The Likelihood Function for a geometric random variable   is:
 
  • The Log-Likelihood Function is:
 
  • The Score Function (first derivative of the log-likelihood w.r.t.  ) is:
 
  • The second derivative of the log-likelihood function is:
 
  • Fisher Information is calculated as the negative expected value of the second derivative:
 

General properties

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  • The probability generating functions of geometric random variables   and   defined over   and   are, respectively,[6]: 114–115 
 
  • The characteristic function   is equal to   so the geometric distribution's characteristic function, when defined over   and   respectively, is[11]: 1630  
  • The entropy of a geometric distribution with parameter   is[12] 
  • Given a mean, the geometric distribution is the maximum entropy probability distribution of all discrete probability distributions. The corresponding continuous distribution is the exponential distribution.[13]
  • The geometric distribution defined on   is infinitely divisible, that is, for any positive integer  , there exist   independent identically distributed random variables whose sum is also geometrically distributed. This is because the negative binomial distribution can be derived from a Poisson-stopped sum of logarithmic random variables.[11]: 606–607 
  • The decimal digits of the geometrically distributed random variable Y are a sequence of independent (and not identically distributed) random variables.[citation needed] For example, the hundreds digit D has this probability distribution:
 
where q = 1 − p, and similarly for the other digits, and, more generally, similarly for numeral systems with other bases than 10. When the base is 2, this shows that a geometrically distributed random variable can be written as a sum of independent random variables whose probability distributions are indecomposable.
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  • The sum of   independent geometric random variables with parameter   is a negative binomial random variable with parameters   and  .[14] The geometric distribution is a special case of the negative binomial distribution, with  .
  • The geometric distribution is a special case of discrete compound Poisson distribution.[11]: 606 
  • The minimum of   geometric random variables with parameters   is also geometrically distributed with parameter  .[15]
  • Suppose 0 < r < 1, and for k = 1, 2, 3, ... the random variable Xk has a Poisson distribution with expected value rk/k. Then
 
has a geometric distribution taking values in  , with expected value r/(1 − r).[citation needed]
  • The exponential distribution is the continuous analogue of the geometric distribution. Applying the floor function to the exponential distribution with parameter   creates a geometric distribution with parameter   defined over  .[3]: 74  This can be used to generate geometrically distributed random numbers as detailed in § Random variate generation.
  • If p = 1/n and X is geometrically distributed with parameter p, then the distribution of X/n approaches an exponential distribution with expected value 1 as n → ∞, since More generally, if p = λ/n, where λ is a parameter, then as n→ ∞ the distribution of X/n approaches an exponential distribution with rate λ:  therefore the distribution function of X/n converges to  , which is that of an exponential random variable.[citation needed]
  • The index of dispersion of the geometric distribution is   and its coefficient of variation is  . The distribution is overdispersed.[1]: 216 

Statistical inference

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The true parameter   of an unknown geometric distribution can be inferred through estimators and conjugate distributions.

Method of moments

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Provided they exist, the first   moments of a probability distribution can be estimated from a sample   using the formula where   is the  th sample moment and  .[16]: 349–350  Estimating   with   gives the sample mean, denoted  . Substituting this estimate in the formula for the expected value of a geometric distribution and solving for   gives the estimators   and   when supported on   and   respectively. These estimators are biased since   as a result of Jensen's inequality.[17]: 53–54 

Maximum likelihood estimation

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The maximum likelihood estimator of   is the value that maximizes the likelihood function given a sample.[16]: 308  By finding the zero of the derivative of the log-likelihood function when the distribution is defined over  , the maximum likelihood estimator can be found to be  , where   is the sample mean.[18] If the domain is  , then the estimator shifts to  . As previously discussed in § Method of moments, these estimators are biased.

Regardless of the domain, the bias is equal to

 

which yields the bias-corrected maximum likelihood estimator,[citation needed]

 

Bayesian inference

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In Bayesian inference, the parameter   is a random variable from a prior distribution with a posterior distribution calculated using Bayes' theorem after observing samples.[17]: 167  If a beta distribution is chosen as the prior distribution, then the posterior will also be a beta distribution and it is called the conjugate distribution. In particular, if a   prior is selected, then the posterior, after observing samples  , is[19] Alternatively, if the samples are in  , the posterior distribution is[20] Since the expected value of a   distribution is  ,[11]: 145  as   and   approach zero, the posterior mean approaches its maximum likelihood estimate.

Random variate generation

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The geometric distribution can be generated experimentally from i.i.d. standard uniform random variables by finding the first such random variable to be less than or equal to  . However, the number of random variables needed is also geometrically distributed and the algorithm slows as   decreases.[21]: 498 

Random generation can be done in constant time by truncating exponential random numbers. An exponential random variable   can become geometrically distributed with parameter   through  . In turn,   can be generated from a standard uniform random variable   altering the formula into  .[21]: 499–500 [22]

Applications

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The geometric distribution is used in many disciplines. In queueing theory, the M/M/1 queue has a steady state following a geometric distribution.[23] In stochastic processes, the Yule Furry process is geometrically distributed.[24] The distribution also arises when modeling the lifetime of a device in discrete contexts.[25] It has also been used to fit data including modeling patients spreading COVID-19.[26]

See also

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References

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  1. ^ a b c d e f Johnson, Norman L.; Kemp, Adrienne W.; Kotz, Samuel (2005-08-19). Univariate Discrete Distributions. Wiley Series in Probability and Statistics (1 ed.). Wiley. doi:10.1002/0471715816. ISBN 978-0-471-27246-5.
  2. ^ a b Nagel, Werner; Steyer, Rolf (2017-04-04). Probability and Conditional Expectation: Fundamentals for the Empirical Sciences. Wiley Series in Probability and Statistics (1st ed.). Wiley. doi:10.1002/9781119243496. ISBN 978-1-119-24352-6.
  3. ^ a b c d e Chattamvelli, Rajan; Shanmugam, Ramalingam (2020). Discrete Distributions in Engineering and the Applied Sciences. Synthesis Lectures on Mathematics & Statistics. Cham: Springer International Publishing. doi:10.1007/978-3-031-02425-2. ISBN 978-3-031-01297-6.
  4. ^ Dekking, Frederik Michel; Kraaikamp, Cornelis; Lopuhaä, Hendrik Paul; Meester, Ludolf Erwin (2005). A Modern Introduction to Probability and Statistics. Springer Texts in Statistics. London: Springer London. p. 50. doi:10.1007/1-84628-168-7. ISBN 978-1-85233-896-1.
  5. ^ Weisstein, Eric W. "Memoryless". mathworld.wolfram.com. Retrieved 2024-07-25.
  6. ^ a b c d e Forbes, Catherine; Evans, Merran; Hastings, Nicholas; Peacock, Brian (2010-11-29). Statistical Distributions (1st ed.). Wiley. doi:10.1002/9780470627242. ISBN 978-0-470-39063-4.
  7. ^ Bertsekas, Dimitri P.; Tsitsiklis, John N. (2008). Introduction to probability. Optimization and computation series (2nd ed.). Belmont: Athena Scientific. p. 235. ISBN 978-1-886529-23-6.
  8. ^ Weisstein, Eric W. "Geometric Distribution". MathWorld. Retrieved 2024-07-13.
  9. ^ Aggarwal, Charu C. (2024). Probability and Statistics for Machine Learning: A Textbook. Cham: Springer Nature Switzerland. p. 138. doi:10.1007/978-3-031-53282-5. ISBN 978-3-031-53281-8.
  10. ^ a b Chan, Stanley (2021). Introduction to Probability for Data Science (1st ed.). Michigan Publishing. ISBN 978-1-60785-747-1.
  11. ^ a b c d Lovric, Miodrag, ed. (2011). International Encyclopedia of Statistical Science (1st ed.). Berlin, Heidelberg: Springer Berlin Heidelberg. doi:10.1007/978-3-642-04898-2. ISBN 978-3-642-04897-5.
  12. ^ a b Gallager, R.; van Voorhis, D. (March 1975). "Optimal source codes for geometrically distributed integer alphabets (Corresp.)". IEEE Transactions on Information Theory. 21 (2): 228–230. doi:10.1109/TIT.1975.1055357. ISSN 0018-9448.
  13. ^ Lisman, J. H. C.; Zuylen, M. C. A. van (March 1972). "Note on the generation of most probable frequency distributions". Statistica Neerlandica. 26 (1): 19–23. doi:10.1111/j.1467-9574.1972.tb00152.x. ISSN 0039-0402.
  14. ^ Pitman, Jim (1993). Probability. New York, NY: Springer New York. p. 372. doi:10.1007/978-1-4612-4374-8. ISBN 978-0-387-94594-1.
  15. ^ Ciardo, Gianfranco; Leemis, Lawrence M.; Nicol, David (1 June 1995). "On the minimum of independent geometrically distributed random variables". Statistics & Probability Letters. 23 (4): 313–326. doi:10.1016/0167-7152(94)00130-Z. hdl:2060/19940028569. S2CID 1505801.
  16. ^ a b Evans, Michael; Rosenthal, Jeffrey (2023). Probability and Statistics: The Science of Uncertainty (2nd ed.). Macmillan Learning. ISBN 978-1429224628.
  17. ^ a b Held, Leonhard; Sabanés Bové, Daniel (2020). Likelihood and Bayesian Inference: With Applications in Biology and Medicine. Statistics for Biology and Health. Berlin, Heidelberg: Springer Berlin Heidelberg. doi:10.1007/978-3-662-60792-3. ISBN 978-3-662-60791-6.
  18. ^ Siegrist, Kyle (2020-05-05). "7.3: Maximum Likelihood". Statistics LibreTexts. Retrieved 2024-06-20.
  19. ^ Fink, Daniel. "A Compendium of Conjugate Priors". CiteSeerX 10.1.1.157.5540.
  20. ^ "3. Conjugate families of distributions" (PDF). Archived (PDF) from the original on 2010-04-08.
  21. ^ a b Devroye, Luc (1986). Non-Uniform Random Variate Generation. New York, NY: Springer New York. doi:10.1007/978-1-4613-8643-8. ISBN 978-1-4613-8645-2.
  22. ^ Knuth, Donald Ervin (1997). The Art of Computer Programming. Vol. 2 (3rd ed.). Reading, Mass: Addison-Wesley. p. 136. ISBN 978-0-201-89683-1.
  23. ^ Daskin, Mark S. (2021). Bite-Sized Operations Management. Synthesis Lectures on Operations Research and Applications. Cham: Springer International Publishing. p. 127. doi:10.1007/978-3-031-02493-1. ISBN 978-3-031-01365-2.
  24. ^ Madhira, Sivaprasad; Deshmukh, Shailaja (2023). Introduction to Stochastic Processes Using R. Singapore: Springer Nature Singapore. p. 449. doi:10.1007/978-981-99-5601-2. ISBN 978-981-99-5600-5.
  25. ^ Gupta, Rakesh; Gupta, Shubham; Ali, Irfan (2023), Garg, Harish (ed.), "Some Discrete Parametric Markov–Chain System Models to Analyze Reliability", Advances in Reliability, Failure and Risk Analysis, Singapore: Springer Nature Singapore, pp. 305–306, doi:10.1007/978-981-19-9909-3_14, ISBN 978-981-19-9908-6, retrieved 2024-07-13
  26. ^ Polymenis, Athanase (2021-10-01). "An application of the geometric distribution for assessing the risk of infection with SARS-CoV-2 by location". Asian Journal of Medical Sciences. 12 (10): 8–11. doi:10.3126/ajms.v12i10.38783. ISSN 2091-0576.