baskexact analytically calculates the operating
characteristics of the power prior basket trial design (Baumann et. al,
2024) and the design of Fujikawa et al. (2020). Both designs were
developed for the analysis of uncontrolled basket trials with a binary
endpoint. Baskets are analysed using beta posteriors, where the
posterior parameters are computed as weighted sums of the available
information to share information between baskets. Currently
baskexact supports single-stage and two-stage designs with
equal sample sizes.
The first step is always to create a basket trial object using either
setupOneStageBasket for a single-stage trial or
setupTwoStageBasket for a two-stage trial. For example:
k is the number of baskets, shape1 and
shape2 are the two shape parameters of the beta-prior of
the response probabilities of each basket and p0 is the
response probability under the null hypothesis. Note that currently only
common prior parameters and a common null response probability are
supported.
The most important operating characteristics be calculated using the
functions toer (type 1 error rate), pow
(power) and ecd (expected number of correct decisions). For
example:
toer(
design = design,
p1 = NULL,
n = 15,
lambda = 0.99,
weight_fun = weights_cpp,
weight_params = list(a = 2, b = 2),
results = "group"
)p1 refers to the true response probabilities under which
the type 1 error rate is computed. Since p1 = NULL is
specified, the type 1 error rates under a global null hypothesis are
calculated. n specifies the sample size per basket.
lambda is the posterior probability cut-off to reject the
null hypothesis. If the posterior probability that the response
probability of the basket is larger than p0 is larger than
lambda, then the null hypothesis is rejected.
weight_fun specifies which method should be used to
calculate the weights. With weights_cpp the weights are
calculated based on a response rate differences between baskets. In
weight_params a list of parameters that further define the
weights is given. See Baumann et al. (2024) for details.
results specifies whether only the family wise type 1 error
rate (option fwer) or also the basketwise type 1 error
rates (option group) are calculated.
To find the probability cut-off lambda such that a
certain FWER is maintained, use adjust_lambda, for example
to find lambda such that the FWER does not exceed 2.5%
(note that all hypotheses are tested one-sided):
adjust_lambda(
design = design,
alpha = 0.025,
p1 = NULL,
n = 15,
weight_fun = weights_cpp,
weight_params = list(a = 2, b = 2),
prec_digits = 4
)
# $lambda
# [1] 0.991
#
# $toer
# [1] 0.0231528With prec_digits it is specified how many decimal places
of lambda are considered. Use toer with
lambda = 0.9909 to check that 0.991 is indeed the smallest
probability cut-off with four decimals with a FWER of at most 2.5%. Note
that even when considering more decimal places the actual FWER will
generally below the nominal level (quite substantially in some cases),
since the outcome (number of responses) is discrete.
Baumann, L., Sauer, L., & Kieser, M. (2024). A basket trial design based on power priors. arXiv:2309.06988. Fujikawa, K., Teramukai, S., Yokota, I., & Daimon, T. (2020). A Bayesian basket trial design that borrows information across strata based on the similarity between the posterior distributions of the response probability. Biometrical Journal, 62(2), 330-338.