Lognormal distribution parameters mu and sigma

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Day
Day el 9 de Abr. de 2024
Editada: Jeremy Huard el 19 de Nov. de 2024
Hi,
I want to generate a lognormal distribution for a set of data measurments using Simbiology model analyzer. I need to insert the mu and sigma for of this distribution as shown in the attachment. Is mu=log(mean) and sigma=log(Standard deviation)?
Thank you!

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John D'Errico
John D'Errico el 9 de Abr. de 2024
Editada: John D'Errico el 9 de Abr. de 2024
Ran in:
In MATLAB, the tools that use a lognormal distribution have you provide mu and sigma in terms of the underlying normal distribution. For example...
help lognrnd
LOGNRND Random arrays from the lognormal distribution. R = LOGNRND(MU,SIGMA) returns an array of random numbers generated from the lognormal distribution with parameters MU and SIGMA. MU and SIGMA are the mean and standard deviation, respectively, of the associated normal distribution. The size of R is the common size of MU and SIGMA if both are arrays. If either parameter is a scalar, the size of R is the size of the other parameter. R = LOGNRND(MU,SIGMA,M,N,...) or R = LOGNRND(MU,SIGMA,[M,N,...]) returns an M-by-N-by-... array. The mean and variance of a lognormal random variable with parameters MU and SIGMA are M = exp(MU + SIGMA^2/2) V = exp(2*MU + SIGMA^2) * (exp(SIGMA^2) - 1) Therefore, to generate data from a lognormal distribution with mean M and Variance V, use MU = log(M^2 / sqrt(V+M^2)) SIGMA = sqrt(log(V/M^2 + 1)) See also LOGNCDF, LOGNFIT, LOGNINV, LOGNLIKE, LOGNPDF, LOGNSTAT, RANDOM, RANDN. Documentation for lognrnd doc lognrnd
In that help, you can see how to choose mu and sigma, IF you know the mean and variance of the distribution you wish to see.
That is, if you know the mean and variance of the lognormal distribution you wish, choose mu and sigma as:
MU = log(M^2 / sqrt(V+M^2))
SIGMA = sqrt(log(V/M^2 + 1))
For example, choosing a lognormal with mean 2, and standard deviation 0.5 (so a variance of 0.25) we would see:
M = 2;
V = 0.25;
MU = log(M^2 / sqrt(V+M^2))
MU = 0.6628
SIGMA = sqrt(log(V/M^2 + 1))
SIGMA = 0.2462
X = lognrnd(MU,SIGMA,[1e8,1]);
mean(X)
ans = 2.0001
std(X)
ans = 0.5000
And that is exactly what we would expect from a random sample. I believe Simbiology would use the same version of a lognormal distribution.

Más respuestas (2)

Bruno Luong
Bruno Luong el 9 de Abr. de 2024
Editada: Bruno Luong el 9 de Abr. de 2024
Is mu=log(mean) and sigma=log(Standard deviation)?
No: https://en.wikipedia.org/wiki/Log-normal_distribution
If X is log-normal random variable
  • mu is mean of log(X)
  • sigma is standard deviation of log(X)
  • log(X) is Gaussian random variable
Jeremy Huard
Jeremy Huard el 19 de Nov. de 2024
Editada: Jeremy Huard el 19 de Nov. de 2024
You can find a good description of how to specify the lognormal distribution parameters µ and σ from the mean m and variance v:
Lognormal distribution

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