initValuesOW: Initial values and search region for Odd Weibull distribution
In RelDists: Estimation for some Reliability Distributions

initValuesOW

R Documentation

Initial values and search region for Odd Weibull distribution

Description

This function can be used so as to get suggestions about initial values and the search region for parameter estimation in OW distribution.

Usage

initValuesOW(
  formula,
  data = NULL,
  local_reg = loess.options(),
  interpolation = interp.options(),
  ...
)

Arguments

`formula`	an object of class `formula` with the response on the left of an operator `~`. The right side must be `1`.
`data`	an optional data frame containing the response variables. If data is not specified, the variables are taken from the environment from which `initValuesOW` is called.
`local_reg`	a list of control parameters for LOESS. See `loess.options`.
`interpolation`	a list of control parameters for interpolation function. See `interp.options`.
`...`	further arguments passed to `TTTE_Analytical`.

Details

This function performs a non-parametric estimation of the empirical total time on test (TTT) plot. Then, this estimated curve can be used so as to get suggestions about initial values and the search region for parameters based on hazard shape associated to the shape of empirical TTT plot.

Value

Returns an object of class c("initValOW", "HazardShape") containing:

sigma.start value for sigma parameter of OW distribution.
nu.start value for nu parameter of OW distribution.
sigma.valid search region for sigma parameter of OW distribution.
nu.valid search region for nu parameter of OW distribution.
TTTplot Total Time on Test transform computed from the data.
hazard_type shape of the hazard function determined from the TTT plot.

Author(s)

Jaime Mosquera Gutiérrez jmosquerag@unal.edu.co

Examples

# Example 1
# Bathtuh hazard and its corresponding TTT plot
y1 <- rOW(n = 1000, mu = 0.1, sigma = 7, nu = 0.08)
my_initial_guess1 <- initValuesOW(formula=y1~1)
summary(my_initial_guess1)
plot(my_initial_guess1, par_plot=list(mar=c(3.7,3.7,1,2.5),
                                     mgp=c(2.5,1,0)))

curve(hOW(x, mu = 0.022, sigma = 8, nu = 0.01), from = 0, 
      to = 80, ylim = c(0, 0.04), col = "red", 
      ylab = "Hazard function", las = 1)

# Example 2
# Bathtuh hazard and its corresponding TTT plot with right censored data

y2 <- rOW(n = 1000, mu = 0.1, sigma = 7, nu = 0.08)
status <- c(rep(1, 980), rep(0, 20))
my_initial_guess2 <- initValuesOW(formula=Surv(y2, status)~1)
summary(my_initial_guess2)
plot(my_initial_guess2, par_plot=list(mar=c(3.7,3.7,1,2.5),
                                     mgp=c(2.5,1,0)))

curve(hOW(x, mu = 0.022, sigma = 8, nu = 0.01), from = 0, 
      to = 80, ylim = c(0, 0.04), col = "red", 
      ylab = "Hazard function", las = 1)

RelDists documentation built on Dec. 23, 2022, 1:26 a.m.