Cumulative frequency analysis is the analysis of the frequency of occurrence of values of a phenomenon less than a reference value. The phenomenon may be time- or space-dependent. Cumulative frequency is also called ''frequency of non-exceedance''. Cumulative frequency analysis is performed to obtain insight into how often a certain phenomenon (feature) is below a certain value. This may help in describing or explaining a situation in which the phenomenon is involved, or in planning interventions, for example in flood protection.Benson, M.A. 1960. Characteristics of frequency curves based on a theoretical 1000-year record. In: T.Dalrymple (ed.), Flood frequency analysis. U.S. Geological Survey Water Supply paper 1543-A, pp. 51–71 This statistical technique can be used to see how likely an event like a flood is going to happen again in the future, based on how often it happened in the past. It can be adapted to bring in things like climate change causing wetter winters and drier summers.

Principles

Definitions

Frequency analysis''Frequency and Regression Analysis''. Chapter 6 in: H.P. Ritzema (ed., 1994), ''Drainage Principles and Applications'', Publ. 16, pp. 175–224, International Institute for Land Reclamation and Improvement (ILRI), Wageningen, The Netherlands. . Free download from the webpag

under nr. 12, or directly as PDF

/ref> is the analysis of how often, or how frequently, an observed phenomenon occurs in a certain range. Frequency analysis applies to a record of length ''N'' of observed data ''X''₁, ''X''₂, ''X''₃ . . . ''X''_N on a variable phenomenon ''X''. The record may be time-dependent (e.g. rainfall measured in one spot) or space-dependent (e.g. crop yields in an area) or otherwise. The cumulative frequency of a reference value is the frequency by which the observed values are less than or equal to . The relative cumulative frequency ''Fc'' can be calculated from: where ''N'' is the number of data Briefly this expression can be noted as: When , where is the unique minimum value observed, it is found that , because . On the other hand, when , where is the unique maximum value observed, it is found that , because . Hence, when this signifies that is a value whereby all data are less than or equal to . In percentage the equation reads:

Probability estimate

From cumulative frequency

The cumulative probability ''Pc'' of ''X'' to be smaller than or equal to ''Xr'' can be estimated in several ways on the basis of the cumulative frequency ''M''. One way is to use the relative cumulative frequency ''Fc'' as an estimate. Another way is to take into account the possibility that in rare cases ''X'' may assume values larger than the observed maximum ''X''_max. This can be done dividing the cumulative frequency ''M'' by ''N''+1 instead of ''N''. The estimate then becomes: There exist also other proposals for the denominator (see

plotting position Plot or Plotting may refer to: Art, media and entertainment * Plot (narrative), the story of a piece of fiction Music * ''The Plot'' (album), a 1976 album by jazz trumpeter Enrico Rava * The Plot (band), a band formed in 2003 Other * ''Plot'' ...

s).

By ranking technique

The estimation of probability is made easier by ranking the data. When the observed data of ''X'' are arranged in ''ascending order'' (, the minimum first and the maximum last), and ''Ri'' is the rank number of the observation ''Xi'', where the adfix ''i'' indicates the serial number in the range of ascending data, then the cumulative probability may be estimated by: When, on the other hand, the observed data from ''X'' are arranged in ''descending order'', the maximum first and the minimum last, and ''Rj'' is the rank number of the observation ''Xj'', the cumulative probability may be estimated by:

Fitting of probability distributions

Continuous distributions

To present the cumulative frequency distribution as a continuous mathematical equation instead of a discrete set of data, one may try to fit the cumulative frequency distribution to a known cumulative probability distribution,.
If successful, the known equation is enough to report the frequency distribution and a table of data will not be required. Further, the equation helps interpolation and extrapolation. However, care should be taken with extrapolating a cumulative frequency distribution, because this may be a source of errors. One possible error is that the frequency distribution does not follow the selected probability distribution any more beyond the range of the observed data. Any equation that gives the value 1 when integrated from a lower limit to an upper limit agreeing well with the data range, can be used as a probability distribution for fitting. A sample of probability distributions that may be used can be found in ''

probability distributions In probability theory and statistics, a probability distribution is the mathematical function that gives the probabilities of occurrence of different possible outcomes for an experiment. It is a mathematical description of a random phenomenon ...

''. Probability distributions can be fitted by several methods, for example: *the parametric method, determining the parameters like mean and standard deviation from the ''X'' data using the method of moments, the maximum likelihood method and the method of probability weighted moments. *the regression method, linearizing the probability distribution through transformation and determining the parameters from a linear regression of the transformed ''Pc'' (obtained from ranking) on the transformed ''X'' data. Application of both types of methods using for example *the normal distribution, the

lognormal distribution In probability theory, a log-normal (or lognormal) distribution is a continuous probability distribution of a random variable whose logarithm is normally distributed. Thus, if the random variable is log-normally distributed, then has a normal ...

, the

logistic distribution Logistic may refer to: Mathematics * Logistic function, a sigmoid function used in many fields ** Logistic map, a recurrence relation that sometimes exhibits chaos ** Logistic regression, a statistical model using the logistic function ** Logit, ...

, the loglogistic distribution, the exponential distribution, the

Fréchet distribution The Fréchet distribution, also known as inverse Weibull distribution, is a special case of the generalized extreme value distribution. It has the cumulative distribution function :\Pr(X \le x)=e^ \text x>0. where ''α'' > 0 is a ...

, the Gumbel distribution, the Pareto distribution, the

Weibull distribution In probability theory and statistics, the Weibull distribution is a continuous probability distribution. It is named after Swedish mathematician Waloddi Weibull, who described it in detail in 1951, although it was first identified by Maurice Re ...

and other often shows that a number of distributions fit the data well and do not yield significantly different results, while the differences between them may be small compared to the width of the confidence interval. This illustrates that it may be difficult to determine which distribution gives better results. For example, approximately normally distributed data sets can be fitted to a large number of different probability distributions. while negatively skewed distributions can be fitted to square normal and mirrored Gumbel distributions. SanLor

Discontinuous distributions

Sometimes it is possible to fit one type of probability distribution to the lower part of the data range and another type to the higher part, separated by a breakpoint, whereby the overall fit is improved. The figure gives an example of a useful introduction of such a discontinuous distribution for rainfall data in northern Peru, where the climate is subject to the behavior Pacific Ocean current

El Niño El Niño (; ; ) is the warm phase of the El Niño–Southern Oscillation (ENSO) and is associated with a band of warm ocean water that develops in the central and east-central equatorial Pacific (approximately between the International Date ...

. When the ''Niño'' extends to the south of Ecuador and enters the ocean along the coast of Peru, the climate in Northern Peru becomes tropical and wet. When the ''Niño'' does not reach Peru, the climate is semi-arid. For this reason, the higher rainfalls follow a different frequency distribution than the lower rainfalls.CumFreq, a program for cumulative frequency analysis with confidence bands, return periods, and a discontinuity option. Free download from

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Prediction

Uncertainty

When a cumulative frequency distribution is derived from a record of data, it can be questioned if it can be used for predictions. For example, given a distribution of river discharges for the years 1950–2000, can this distribution be used to predict how often a certain river discharge will be exceeded in the years 2000–50? The answer is yes, provided that the environmental conditions do not change. If the environmental conditions do change, such as alterations in the infrastructure of the river's watershed or in the rainfall pattern due to climatic changes, the prediction on the basis of the historical record is subject to a ''systematic error''. Even when there is no systematic error, there may be a random error, because by chance the observed discharges during 1950 − 2000 may have been higher or lower than normal, while on the other hand the discharges from 2000 to 2050 may by chance be lower or higher than normal. Issues around this have been explored in the book The Black Swan.

Confidence intervals

Probability theory Probability theory is the branch of mathematics concerned with probability. Although there are several different probability interpretations, probability theory treats the concept in a rigorous mathematical manner by expressing it through a set ...

can help to estimate the range in which the random error may be. In the case of cumulative frequency there are only two possibilities: a certain reference value is exceeded or it is not exceeded. The sum of

frequency of exceedance The frequency of exceedance, sometimes called the annual rate of exceedance, is the frequency with which a random process exceeds some critical value. Typically, the critical value is far from the mean. It is usually defined in terms of the number ...

and cumulative frequency is 1 or 100%. Therefore, the binomial distribution can be used in estimating the range of the random error. According to the normal theory, the binomial distribution can be approximated and for large standard deviation can be calculated as follows: where ''Pc'' is the cumulative probability and ''N'' is the number of data. It is seen that the standard deviation ''Sd'' reduces at an increasing number of observations ''N''. The determination of the '' confidence interval'' of ''Pc'' makes use of '' Student's t-test'' (''t''). The value of ''t'' depends on the number of data and the confidence level of the estimate of the confidence interval. Then, the lower (''L'') and upper (''U'') confidence limits of ''Pc'' in a

symmetrical Symmetry (from grc, συμμετρία "agreement in dimensions, due proportion, arrangement") in everyday language refers to a sense of harmonious and beautiful proportion and balance. In mathematics, "symmetry" has a more precise definiti ...

distribution are found from: This is known as Wald interval. However, the binomial distribution is only symmetrical around the mean when , but it becomes

asymmetrical Asymmetry is the absence of, or a violation of, symmetry (the property of an object being invariant to a transformation, such as reflection). Symmetry is an important property of both physical and abstract systems and it may be displayed in pre ...

and more and more skew when ''Pc'' approaches 0 or 1. Therefore, by approximation, ''Pc'' and 1−''Pc'' can be used as weight factors in the assignation of ''t.Sd'' to ''L'' and ''U'' : where it can be seen that these expressions for ''Pc'' = 0.5 are the same as the previous ones.

Notes

*The Wald interval is known to perform poorly. *The Wilson score interval provides confidence interval for binomial distributions based on score tests and has better sample coverage, see and

binomial proportion confidence interval In statistics, a binomial proportion confidence interval is a confidence interval for the probability of success calculated from the outcome of a series of success–failure experiments (Bernoulli trial, Bernoulli trials). In other words, a binomia ...

for a more detailed overview. *Instead of the "Wilson score interval" the "Wald interval" can also be used provided the above weight factors are included.

Return period

The cumulative probability ''Pc'' can also be called ''probability of non-exceedance''. The

probability of exceedance The frequency of exceedance, sometimes called the annual rate of exceedance, is the frequency with which a random process exceeds some critical value. Typically, the critical value is far from the mean. It is usually defined in terms of the number ...

(also called

survival function The survival function is a function that gives the probability that a patient, device, or other object of interest will survive past a certain time. The survival function is also known as the survivor function or reliability function. The te ...

) is found from: The

return period A return period, also known as a recurrence interval or repeat interval, is an average time or an estimated average time between events such as earthquakes, floods, landslides, or river discharge flows to occur. It is a statistical measurement typ ...

''T'' defined as: and indicates the expected number of observations that have to be done again to find the value of the variable in study greater than the value used for ''T''.
The upper (''T_U'') and lower (''T_L'') confidence limits of

s can be found respectively as: For extreme values of the variable in study, ''U'' is close to 1 and small changes in ''U'' originate large changes in ''T_U''. Hence, the estimated return period of extreme values is subject to a large random error. Moreover, the confidence intervals found hold for a long-term prediction. For predictions at a shorter run, the confidence intervals and may actually be wider. Together with the limited certainty (less than 100%) used in the ''t−test'', this explains why, for example, a 100-year rainfall might occur twice in 10 years. The strict notion of ''return period'' actually has a meaning only when it concerns a time-dependent phenomenon, like point rainfall. The return period then corresponds to the expected waiting time until the exceedance occurs again. The return period has the same dimension as the time for which each observation is representative. For example, when the observations concern daily rainfalls, the return period is expressed in days, and for yearly rainfalls it is in years.

Need for confidence belts

The figure shows the variation that may occur when obtaining samples of a variate that follows a certain probability distribution. The data were provided by Benson. The confidence belt around an experimental cumulative frequency or return period curve gives an impression of the region in which the true distribution may be found. Also, it clarifies that the experimentally found best fitting probability distribution may deviate from the true distribution.

Histogram

The observed data can be arranged in classes or groups with serial number . Each group has a lower limit () and an upper limit (). When the class () contains data and the total number of data is , then the relative class or ''group frequency'' is found from: or briefly: or in percentage: The presentation of all class frequencies gives a

frequency distribution In statistics, the frequency (or absolute frequency) of an event i is the number n_i of times the observation has occurred/recorded in an experiment or study. These frequencies are often depicted graphically or in tabular form. Types The cumula ...

, or histogram. Histograms, even when made from the same record, are different for different class limits. The histogram can also be derived from the fitted cumulative probability distribution: There may be a difference between and due to the deviations of the observed data from the fitted distribution (see blue figure). Often it is desired to combine the histogram with a

probability density function In probability theory, a probability density function (PDF), or density of a continuous random variable, is a function whose value at any given sample (or point) in the sample space (the set of possible values taken by the random variable) ca ...

as depicted in the black and white picture.

References

{{DEFAULTSORT:Cumulative Frequency Analysis Frequency distribution