R/Gart_adjusted_logit_CI_2x2.R
In ocbe-uio/contingencytables: Statistical Analysis of Contingency Tables
Defines functions
Gart_adjusted_logit_CI_2x2
Documented in
Gart_adjusted_logit_CI_2x2
#' @title The Gart adjusted logit confidence interval for the odds ratio
#' @description The Gart adjusted logit confidence interval for the odds ratio
#' @description Described in Chapter 4 "The 2x2 Table"
#' @param n the observed table (a 2x2 matrix)
#' @param alpha the nominal level, e.g. 0.05 for 95% CIs
#' @examples
#' Gart_adjusted_logit_CI_2x2(lampasona_2013)
#' Gart_adjusted_logit_CI_2x2(ritland_2007)
#' @export
#' @return An object of the [contingencytables_result] class,
#' basically a subclass of [base::list()]. Use the [utils::str()] function
#' to see the specific elements returned.
Gart_adjusted_logit_CI_2x2 <- function(n, alpha = 0.05) {
validateArguments(mget(ls()))
# Estimate of the odds ratio (thetahat)
estimate <- n[1, 1] * n[2, 2] / (n[1, 2] * n[2, 1])
# Add 1 / 2 to all cells
n11tilde <- n[1, 1] + 0.5
n12tilde <- n[1, 2] + 0.5
n21tilde <- n[2, 1] + 0.5
n22tilde <- n[2, 2] + 0.5
# Adjusted estimate of the odds ratio (thetahattilde)
estimate_adj <- n11tilde * n22tilde / (n12tilde * n21tilde)
# Standard error of the log of the adjusted estimate
SE <- sqrt(1 / n11tilde + 1 / n12tilde + 1 / n21tilde + 1 / n22tilde)
# The upper alpha / 2 percentile of the standard normal distribution
z <- qnorm(1 - alpha / 2, 0, 1)
# Calculate the confidence limits
L <- exp(log(estimate_adj) - z * SE)
U <- exp(log(estimate_adj) + z * SE)
res <- list("lower" = L, "upper" = U, "estimate" = estimate)
return(
contingencytables_result(
res,
sprintf(
"The Gart adjusted logit CI: estimate = %6.4f (%g%% CI %6.4f to %6.4f)",
estimate, 100 * (1 - alpha), L, U
)
)
)
}
ocbe-uio/contingencytables documentation built on March 19, 2024, 4:30 a.m.
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Defines functions Gart_adjusted_logit_CI_2x2
Documented in Gart_adjusted_logit_CI_2x2
#' @title The Gart adjusted logit confidence interval for the odds ratio
#' @description The Gart adjusted logit confidence interval for the odds ratio
#' @description Described in Chapter 4 "The 2x2 Table"
#' @param n the observed table (a 2x2 matrix)
#' @param alpha the nominal level, e.g. 0.05 for 95% CIs
#' @examples
#' Gart_adjusted_logit_CI_2x2(lampasona_2013)
#' Gart_adjusted_logit_CI_2x2(ritland_2007)
#' @export
#' @return An object of the [contingencytables_result] class,
#' basically a subclass of [base::list()]. Use the [utils::str()] function
#' to see the specific elements returned.
Gart_adjusted_logit_CI_2x2 <- function(n, alpha = 0.05) {
validateArguments(mget(ls()))
# Estimate of the odds ratio (thetahat)
estimate <- n[1, 1] * n[2, 2] / (n[1, 2] * n[2, 1])
# Add 1 / 2 to all cells
n11tilde <- n[1, 1] + 0.5
n12tilde <- n[1, 2] + 0.5
n21tilde <- n[2, 1] + 0.5
n22tilde <- n[2, 2] + 0.5
# Adjusted estimate of the odds ratio (thetahattilde)
estimate_adj <- n11tilde * n22tilde / (n12tilde * n21tilde)
# Standard error of the log of the adjusted estimate
SE <- sqrt(1 / n11tilde + 1 / n12tilde + 1 / n21tilde + 1 / n22tilde)
# The upper alpha / 2 percentile of the standard normal distribution
z <- qnorm(1 - alpha / 2, 0, 1)
# Calculate the confidence limits
L <- exp(log(estimate_adj) - z * SE)
U <- exp(log(estimate_adj) + z * SE)
res <- list("lower" = L, "upper" = U, "estimate" = estimate)
return(
contingencytables_result(
res,
sprintf(
"The Gart adjusted logit CI: estimate = %6.4f (%g%% CI %6.4f to %6.4f)",
estimate, 100 * (1 - alpha), L, U
)
)
)
}
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