| lognormgpd {evmix} | R Documentation |
Log-Normal Bulk and GPD Tail Extreme Value Mixture Model
Description
Density, cumulative distribution function, quantile function and
random number generation for the extreme value mixture model with log-normal for bulk
distribution upto the threshold and conditional GPD above threshold. The parameters
are the log-normal mean lnmean and standard deviation lnsd, threshold u
GPD scale sigmau and shape xi and tail fraction phiu.
Usage
dlognormgpd(x, lnmean = 0, lnsd = 1, u = qlnorm(0.9, lnmean, lnsd),
sigmau = lnsd, xi = 0, phiu = TRUE, log = FALSE)
plognormgpd(q, lnmean = 0, lnsd = 1, u = qlnorm(0.9, lnmean, lnsd),
sigmau = lnsd, xi = 0, phiu = TRUE, lower.tail = TRUE)
qlognormgpd(p, lnmean = 0, lnsd = 1, u = qlnorm(0.9, lnmean, lnsd),
sigmau = lnsd, xi = 0, phiu = TRUE, lower.tail = TRUE)
rlognormgpd(n = 1, lnmean = 0, lnsd = 1, u = qlnorm(0.9, lnmean,
lnsd), sigmau = lnsd, xi = 0, phiu = TRUE)
Arguments
x |
quantiles |
lnmean |
mean on log scale |
lnsd |
standard deviation on log scale (positive) |
u |
threshold |
sigmau |
scale parameter (positive) |
xi |
shape parameter |
phiu |
probability of being above threshold |
log |
logical, if TRUE then log density |
q |
quantiles |
lower.tail |
logical, if FALSE then upper tail probabilities |
p |
cumulative probabilities |
n |
sample size (positive integer) |
Details
Extreme value mixture model combining log-normal distribution for the bulk below the threshold and GPD for upper tail.
The user can pre-specify phiu
permitting a parameterised value for the tail fraction \phi_u. Alternatively, when
phiu=TRUE the tail fraction is estimated as the tail fraction from the
log-normal bulk model.
The cumulative distribution function with tail fraction \phi_u defined by the
upper tail fraction of the log-normal bulk model (phiu=TRUE), upto the
threshold 0 < x \le u, given by:
F(x) = H(x)
and above the threshold x > u:
F(x) = H(u) + [1 - H(u)] G(x)
where H(x) and G(X) are the log-normal and conditional GPD
cumulative distribution functions (i.e. plnorm(x, lnmean, lnsd) and
pgpd(x, u, sigmau, xi)) respectively.
The cumulative distribution function for pre-specified \phi_u, upto the
threshold 0 < x \le u, is given by:
F(x) = (1 - \phi_u) H(x)/H(u)
and above the threshold x > u:
F(x) = \phi_u + [1 - \phi_u] G(x)
Notice that these definitions are equivalent when \phi_u = 1 - H(u).
The log-normal is defined on the positive reals, so the threshold must be positive.
See gpd for details of GPD upper tail component and
dlnorm for details of log-normal bulk component.
Value
dlognormgpd gives the density,
plognormgpd gives the cumulative distribution function,
qlognormgpd gives the quantile function and
rlognormgpd gives a random sample.
Note
All inputs are vectorised except log and lower.tail.
The main inputs (x, p or q) and parameters must be either
a scalar or a vector. If vectors are provided they must all be of the same length,
and the function will be evaluated for each element of vector. In the case of
rlognormgpd any input vector must be of length n.
Default values are provided for all inputs, except for the fundamentals
x, q and p. The default sample size for
rlognormgpd is 1.
Missing (NA) and Not-a-Number (NaN) values in x,
p and q are passed through as is and infinite values are set to
NA. None of these are not permitted for the parameters.
Error checking of the inputs (e.g. invalid probabilities) is carried out and will either stop or give warning message as appropriate.
Author(s)
Yang Hu and Carl Scarrott carl.scarrott@canterbury.ac.nz
References
http://en.wikipedia.org/wiki/Log-normal_distribution
http://en.wikipedia.org/wiki/Generalized_Pareto_distribution
Scarrott, C.J. and MacDonald, A. (2012). A review of extreme value threshold estimation and uncertainty quantification. REVSTAT - Statistical Journal 10(1), 33-59. Available from http://www.ine.pt/revstat/pdf/rs120102.pdf
Solari, S. and Losada, M.A. (2004). A unified statistical model for hydrological variables including the selection of threshold for the peak over threshold method. Water Resources Research. 48, W10541.
See Also
Other lognormgpd: flognormgpdcon,
flognormgpd, lognormgpdcon
Other lognormgpdcon: flognormgpdcon,
flognormgpd, lognormgpdcon
Other normgpd: fgng, fhpd,
fitmnormgpd, flognormgpd,
fnormgpdcon, fnormgpd,
gngcon, gng,
hpdcon, hpd,
itmnormgpd, lognormgpdcon,
normgpdcon, normgpd
Other flognormgpd: flognormgpd
Examples
## Not run:
set.seed(1)
par(mfrow = c(2, 2))
x = rlognormgpd(1000)
xx = seq(-1, 10, 0.01)
hist(x, breaks = 100, freq = FALSE, xlim = c(-1, 10))
lines(xx, dlognormgpd(xx))
# three tail behaviours
plot(xx, plognormgpd(xx), type = "l")
lines(xx, plognormgpd(xx, xi = 0.3), col = "red")
lines(xx, plognormgpd(xx, xi = -0.3), col = "blue")
legend("bottomright", paste("xi =",c(0, 0.3, -0.3)),
col=c("black", "red", "blue"), lty = 1)
x = rlognormgpd(1000, u = 2, phiu = 0.2)
hist(x, breaks = 100, freq = FALSE, xlim = c(-1, 10))
lines(xx, dlognormgpd(xx, u = 2, phiu = 0.2))
plot(xx, dlognormgpd(xx, u = 2, xi=0, phiu = 0.2), type = "l")
lines(xx, dlognormgpd(xx, u = 2, xi=-0.2, phiu = 0.2), col = "red")
lines(xx, dlognormgpd(xx, u = 2, xi=0.2, phiu = 0.2), col = "blue")
legend("topright", c("xi = 0", "xi = 0.2", "xi = -0.2"),
col=c("black", "red", "blue"), lty = 1)
## End(Not run)