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wshape and scale
wscale, threshold u GPD scale sigmau
and shape xi and tail fraction phiu.dbetagpd(x, bshape1 = 1, bshape2 = 1,
u = qbeta(0.9, bshape1, bshape2),
sigmau = sqrt(bshape1 * bshape2/(bshape1 + bshape2)^2/(bshape1 + bshape2 + 1)),
xi = 0, phiu = TRUE, log = FALSE)
pbetagpd(q, bshape1 = 1, bshape2 = 1,
u = qbeta(0.9, bshape1, bshape2),
sigmau = sqrt(bshape1 * bshape2/(bshape1 + bshape2)^2/(bshape1 + bshape2 + 1)),
xi = 0, phiu = TRUE, lower.tail = TRUE)
qbetagpd(p, bshape1 = 1, bshape2 = 1,
u = qbeta(0.9, bshape1, bshape2),
sigmau = sqrt(bshape1 * bshape2/(bshape1 + bshape2)^2/(bshape1 + bshape2 + 1)),
xi = 0, phiu = TRUE, lower.tail = TRUE)
rbetagpd(n = 1, bshape1 = 1, bshape2 = 1,
u = qbeta(0.9, bshape1, bshape2),
sigmau = sqrt(bshape1 * bshape2/(bshape1 + bshape2)^2/(bshape1 + bshape2 + 1)),
xi = 0, phiu = TRUE)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 beta bulk model.
The usual beta distribution is defined on $[0, 1]$,
but this mixture is generally not limited in the upper
tail $[0,\infty]$, except for the usual upper tail
limits for the GPD when xi<0< code=""> discussed in
gpd. Therefore, the threshold is
limited to $(0,1)$.
The cumulative distribution function with tail fraction
$\phi_u$ defined by the upper tail fraction of the
beta bulk model (phiu=TRUE), upto the threshold
$0 \le x \le u < 1$, 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 beta
and conditional GPD cumulative distribution functions
(i.e. pbeta(x, wshape, wscale) and pgpd(x,
u, sigmau, xi)).
The cumulative distribution function for pre-specified
$\phi_u$, upto the threshold $0 \le x \le u < 1$,
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 $\phi_u = 1 - H(u)$.
See gpd for details of GPD upper
tail component and dbeta for
details of beta bulk component.gpd and
dbeta
Other betagpd: fbetagpd,
lbetagpd, nlbetagpdpar(mfrow=c(2,2))
x = rbetagpd(1000, bshape1 = 1.5, bshape2 = 2, u = 0.7, phiu = 0.2)
xx = seq(-0.1, 2, 0.01)
hist(x, breaks = 100, freq = FALSE, xlim = c(-0.1, 2))
lines(xx, dbetagpd(xx, bshape1 = 1.5, bshape2 = 2, u = 0.7, phiu = 0.2))
# three tail behaviours
plot(xx, pbetagpd(xx, bshape1 = 1.5, bshape2 = 2, u = 0.7, phiu = 0.2), type = "l")
lines(xx, pbetagpd(xx, bshape1 = 1.5, bshape2 = 2, u = 0.7, phiu = 0.2, xi = 0.3), col = "red")
lines(xx, pbetagpd(xx, bshape1 = 1.5, bshape2 = 2, u = 0.7, phiu = 0.2, xi = -0.3), col = "blue")
legend("topleft", paste("xi =",c(0, 0.3, -0.3)),
col=c("black", "red", "blue"), lty = 1)
x = rbetagpd(1000, bshape1 = 2, bshape2 = 0.8, u = 0.7, phiu = 0.5)
hist(x, breaks = 100, freq = FALSE, xlim = c(-0.1, 2))
lines(xx, dbetagpd(xx, bshape1 = 2, bshape2 = 0.6, u = 0.7, phiu = 0.5))
plot(xx, dbetagpd(xx, bshape1 = 2, bshape2 = 0.8, u = 0.7, phiu = 0.5, xi=0), type = "l")
lines(xx, dbetagpd(xx, bshape1 = 2, bshape2 = 0.8, u = 0.7, phiu = 0.5, xi=-0.2), col = "red")
lines(xx, dbetagpd(xx, bshape1 = 2, bshape2 = 0.8, u = 0.7, phiu = 0.5, xi=0.2), col = "blue")
legend("topright", c("xi = 0", "xi = 0.2", "xi = -0.2"),
col=c("black", "red", "blue"), lty = 1)Run the code above in your browser using DataLab