dist-hypMode: Hyperbolic mode
In fBasics: Rmetrics - Markets and Basic Statistics
hypMode R Documentation
Hyperbolic mode
Description
Computes the mode of the hyperbolic distribution.
Usage
hypMode(alpha = 1, beta = 0, delta = 1, mu = 0, pm = 1)
Arguments
alpha
shape parameter, a positive number. alpha can also be a
vector of length four, containing alpha, beta,
delta and mu (in that order).
beta
skewness parameter, abs(beta) is in the
range (0, alpha).
delta
scale parameter, must be zero or positive.
mu
location parameter, by default 0.
pm
an integer value between 1 and 4 for the selection of
the parameterization. The default takes the first parameterization.
Value
a numeric value, the mode in the appropriate parameterization for the
hyperbolic distribution.
Author(s)
David Scott for code implemented from R's contributed package
HyperbolicDist.
References
Atkinson, A.C. (1982);
The simulation of generalized inverse Gaussian and hyperbolic
random variables,
SIAM J. Sci. Stat. Comput. 3, 502–515.
Barndorff-Nielsen O. (1977);
Exponentially decreasing distributions for the logarithm of
particle size,
Proc. Roy. Soc. Lond., A353, 401–419.
Barndorff-Nielsen O., Blaesild, P. (1983);
Hyperbolic distributions. In Encyclopedia of Statistical
Sciences,
Eds., Johnson N.L., Kotz S. and Read C.B.,
Vol. 3, pp. 700–707. New York: Wiley.
Raible S. (2000);
Levy Processes in Finance: Theory, Numerics and Empirical Facts,
PhD Thesis, University of Freiburg, Germany, 161 pages.
Examples
## hypMode -
hypMode()
fBasics documentation built on Nov. 3, 2023, 3:01 p.m.
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| hypMode | R Documentation |
Hyperbolic mode
Description
Computes the mode of the hyperbolic distribution.
Usage
hypMode(alpha = 1, beta = 0, delta = 1, mu = 0, pm = 1)
Arguments
alpha |
shape parameter, a positive number. |
beta |
skewness parameter, |
delta |
scale parameter, must be zero or positive. |
mu |
location parameter, by default 0. |
pm |
an integer value between |
Value
a numeric value, the mode in the appropriate parameterization for the hyperbolic distribution.
Author(s)
David Scott for code implemented from R's contributed package
HyperbolicDist.
References
Atkinson, A.C. (1982); The simulation of generalized inverse Gaussian and hyperbolic random variables, SIAM J. Sci. Stat. Comput. 3, 502–515.
Barndorff-Nielsen O. (1977); Exponentially decreasing distributions for the logarithm of particle size, Proc. Roy. Soc. Lond., A353, 401–419.
Barndorff-Nielsen O., Blaesild, P. (1983); Hyperbolic distributions. In Encyclopedia of Statistical Sciences, Eds., Johnson N.L., Kotz S. and Read C.B., Vol. 3, pp. 700–707. New York: Wiley.
Raible S. (2000); Levy Processes in Finance: Theory, Numerics and Empirical Facts, PhD Thesis, University of Freiburg, Germany, 161 pages.
Examples
## hypMode -
hypMode()
R Package Documentation
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We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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