Riociguat phase II
trial: fixed-sample design and optimal two-stage design
In this section we consider the Riociguat phase II
trial in systemic sclerosis (Khanna et
al. 2020), re-analysed in (Kelter
2026). For day-to-day use, the recommended entry points are the
design wrappers
design_twoarm_onestage_bf() for fixed-sample designs
without interim analysis, and
design_twoarm_twostage_bf() for two-stage designs with
an interim analysis for futility.
Both functions calibrate the design with respect to Bayesian and,
optionally, frequentist operating characteristics, and return a rich
object with methods for printing, summarizing, and plotting.
The two-stage design
wrapper design_twoarm_twostage_bf()
The main calibration function for the two-stage design is
design_twoarm_twostage_bf(). Internally, it calls the
lower-level engine optimal_twostage_2arm_bf() to perform
the two-step search (fixed-sample anchor, then interim-grid search), but
users will typically interact only with the wrapper.
For the Bayesian workflow considered in this vignette, the most
important arguments of design_twoarm_twostage_bf() are:
k, k_f: Efficacy and futility thresholds
for the Bayes factor. Evidence against the null is declared when the
Bayes factor falls below k, and compelling evidence for the
null is declared when the Bayes factor exceeds k_f.n1_min, n2_max: Vectors of length 2 giving
the minimal interim and maximal final sample sizes in the two arms.alloc1, alloc2: Allocation probabilities
to the two arms; these must be positive and sum to 1.target_power, target_type1: Target
corrected Bayesian power and type-I error. Internally these determine
alpha and beta for the fixed-sample anchor
search.target_ce_h0: Optional lower bound on the corrected
Bayesian probability of compelling evidence for the null
hypothesis.target_freq_power, target_freq_type1:
Optional targets for frequentist power and type-I error; these can be
activated via the calibration mode.calibration: Calibration criterion, one of
"Bayesian", "frequentist", or
"hybrid". In this vignette we focus on
calibration = "Bayesian".calibration_en: Criterion for ranking designs by
expected sample size, either "Bayesian" (default) or
"frequentist".power_cushion: Optional extra power margin used in step
1 when identifying a sufficient fixed-sample design.interim_fraction: Lower and upper bounds for the
interim sample sizes, expressed as fractions of the fixed-sample sizes
found in step 1. Defaults to c(0, 1), which means all
interim designs between n1_min and the fixed-sample size
are analysed. For example, interim_fraction = c(0.25, 0.75)
restricts the interim look to occur between 25% and 75% of the
fixed-sample size, regardless of the numerical value of
n1_min.grid_step: Spacing of the interim-design grid searched
in step 2.coarse_step: Spacing used in the coarse fixed-sample
search in step 1.max_iter: Maximum number of fixed-sample sizes explored
in step 1.progress: Logical; if TRUE, prints
progress messages during the calibration. This is helpful if a large
number of two-stage designs needs to be analyzed by the algorithm.test: Bayes-factor test "BF01",
"BF+0", "BF-0" or "BF+-".- The prior parameters
a_0_d, b_0_d, a_0_a, b_0_a, …
specify the design and analysis priors under the relevant hypotheses,
exactly as in the one-stage setting.
The function returns an object of class
"twoarm_twostage_bf_design" with the following main
components:
design: Named vector
c(n1_1, n1_2, n2_1, n2_2) giving the interim sample sizes
n1_1, n1_2 and the final sample sizes
n2_1, n2_2.fixed_design: The fixed-sample anchor identified in
step 1, stored as c(n_fixed_1, n_fixed_2).operating_characteristics: Corrected two-stage
operating characteristics of the trial design, accounting for early
stopping for futility (Bayesian power and type-I error, CE(H0), and,
where requested, frequentist operating characteristics and expected
sample sizes).fixed_operating_characteristics: Operating
characteristics of the fixed-sample anchor from step 1.inputs: A list summarising the inputs used to determine
the design.optimizer: A list containing the convergence flag
conv and the prior specification used by the internal
engine.engine_output: The full list returned by the internal
optimizer optimal_twostage_2arm_bf(), retained for
transparency and advanced use.
In the Bayesian workflow, the corrected operating characteristics in
operating_characteristics are the key output, because they
quantify the actual two-stage design rather than the fixed-sample
surrogate used in step 1. The fixed-sample quantities in
fixed_design and
fixed_operating_characteristics are primarily useful as a
comparator.
Convenience methods are provided:
print() gives a concise textual summary of the selected
design and its operating characteristics.summary() adds search-level information and explicit
calibration targets.plot() produces a six-panel base R plot, showing the
design schematic, operating characteristics, and the design and analysis
priors under the relevant hypotheses.
Riociguat phase II
trial: Setup
In the riociguat trial, the reported response rates in the two-arm
binary endpoint example are
p1_riociguat <- 38/(22+38) # control arm response probability
p1_riociguat
#> [1] 0.6333333
p2_riociguat <- 48/(48+11) # treatment arm response probability
p2_riociguat
#> [1] 0.8135593
as given in Section 2.5 of (Kelter
2026). The response in the treatment group is higher compared to
the control group, and the test we perform is \(H_0:p_1=p_2\) versus \(H_+:p_1<p_2\). We thus exclude the
possibility that the response probability in the control group can
outperform the response probability in the treatment group. If this
assumption is too optimistic, we could also perform the test of \(H_-:p_2 \le p_1\) versus \(H_+:p_1<p_2\) or the two-sided test.
Now, we use the following design and analysis priors for this
example:
# flat design priors under H0 and H1 (Riociguat)
a_0_d_rio <- 1
b_0_d_rio <- 1
# slightly informative design prior under H1 (that is, H_+) for the control group
a_1_d_rio <- 1
b_1_d_rio <- 3
# slightly informative design prior under H1 (that is, H_+) for the treatment group
a_2_d_rio <- 3
b_2_d_rio <- 1
# Analysis priors under H0 and H1 (Riociguat)
a_0_a_rio <- 1 # flat under H0
b_0_a_rio <- 1
a_1_a_rio <- 1 # flat under H1 for the control group
b_1_a_rio <- 1
a_2_a_rio <- 1 # flat under H1 for the treatment group
b_2_a_rio <- 1
We focus on the one-sided Bayes factor test
test = "BF+0" with evidence thresholds
k = 1/10 (strong evidence for efficacy) and
k_f = 3 (moderate evidence to stop early for futility),
compare (Kelter 2026). We provide a brief
discussion of choosing these thresholds below.
Riociguat phase II
trial: Fixed-sample comparator via
design_twoarm_onestage_bf()
In the one-stage reference design used in Kelter (2026) for the riociguat example, the
trial uses
- \(n_1 = 60\) patients in the
control arm,
- \(n_2 = 59\) patients in the
treatment arm,
as reported in the paper. We now use
design_twoarm_onestage_bf() to compute a fixed-sample
design that achieves 80% Bayesian power, 2.5% Bayesian type-I error and
60% probability of compelling evidence for the null hypothesis. This
fixed-sample design serves as a comparator for the two-stage design
constructed later.
For the one-stage design, we also request frequentist power and
type-I error to be computed, assuming success probabilities
p1_power in the control arm and p2_power in
the treatment arm. The calibration itself remains Bayesian in this
vignette: the design is selected to meet the Bayesian power and
type-I-error targets, while frequentist quantities are reported but not
used as hard constraints.
The design priors are slightly informative, reflecting the
expectation that the treatment is more effective than placebo in the
control group and encoded by parameters such as
a_1_d = a_1_d_rio. The analysis priors are chosen flat via
parameters such as a_1_a = a_1_a_rio, as in Kelter (2026). To keep the console output
compact in this vignette, we set progress = FALSE; in
practice you can set progress = TRUE to monitor the
calibration.
cat("\n--- One-stage design calibration for riociguat-type trial ---\n")
res_rio_onestage <- design_twoarm_onestage_bf(
n_min = 10,
n_max = 160,
k = 1/10,
k_f = 3,
test = "BF+0",
alloc1 = 0.5,
alloc2 = 0.5,
calibration = "Bayesian",
target_power = 0.8,
target_type1 = 0.025,
target_ce_h0 = 0.60,
target_freq_power = 0.8,
target_freq_type1 = 0.025,
p1_grid = seq(0.01, 0.99, 0.02),
p2_grid = seq(0.01, 0.99, 0.02),
p1_power = 0.4,
p2_power = 0.6,
power_cushion = 0,
sustain_n = 10L,
algorithm = "optimal",
progress = FALSE,
report_freq_type1 = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = a_1_d_rio, b_1_d = b_1_d_rio,
a_2_d = a_2_d_rio, b_2_d = b_2_d_rio,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
The resulting design object can be inspected directly:
One-stage two-arm Bayes factor design
------------------------------------
Mode: optimal
Status: Smallest feasible one-stage two-arm design found.
Calibration: Bayesian
Optional freq. Type-I reporting: off
Design: n_total = 53, n1 = 26, n2 = 27
Operating characteristics
Power = 0.8002
Type-I error = 0.0065
CE(H0) = 0.6206
Freq. Power = 0.1710
which prints the selected total sample size, the allocation into the
two arms, and the corrected Bayesian and frequentist operating
characteristics. For a more detailed view that includes the search
overview and the calibration targets, use:
summary(res_rio_onestage)
Summary: One-stage two-arm Bayes factor design
---------------------------------------------
Mode: optimal
Status: Smallest feasible one-stage two-arm design found.
Calibration: Bayesian
Feasible: yes
Search overview
n evaluated = 151
pointwise feasible = 109
sustained feasible = 108
first pointwise n = 51
first sustained n = 53
Selected design
n_total = 53, n1 = 26, n2 = 27
The wrapper also provides a plotting method that reconstructs the
familiar one-stage calibration plot:
Figure 2 shows the calibrated one-stage design developed in Kelter (2026). In particular, it illustrates
that the one-stage design without an interim analysis requires 53
patients in total (as can be seen in
res_rio_onestage$design) to reach the desired threshold for
Bayesian power, while 45 patients are necessary to reach the desired
probability of compelling evidence for the null hypothesis. The Bayesian
type-I-error constraint is already satisfied at smaller sample sizes.
The frequentist type-I-error rate is controlled with a supremum of
approximately 0.0099 under the null, as can be seen from
One-stage two-arm Bayes factor design
------------------------------------
Mode: optimal
Status: Smallest feasible one-stage two-arm design found.
Calibration: Bayesian
Optional freq. Type-I reporting: on
Design: n_total = 53, n1 = 26, n2 = 27
Operating characteristics
Power = 0.8002
Type-I error = 0.0065
CE(H0) = 0.6206
Freq. Type-I = 0.0099
Freq. Power = 0.1710
whereas the frequentist power requirement of 80% is not reached under
the conservative assumptions \(p_1 =
0.4\) and \(p_2 = 0.6\).
This one-stage design does not include an interim analysis, but it is
fully calibrated from a Bayesian point of view. We could adjust
p1_power and p2_power upwards (for example to
0.6 and 0.8) to explore more optimistic frequentist scenarios. In the
next section we move to the two-stage design, which
introduces an interim analysis for possible early stopping for
futility.
Riociguat phase II
trial: Optimal Bayesian two-stage design via
design_twoarm_twostage_bf()
We now search for an optimal two-stage design that
- controls the Bayesian type-I error at level
alpha = 0.025,
- achieves at least power
1 - beta = 0.8,
- achieves at least probability of compelling evidence
pceH0 = 0.60 for the null hypothesis,
- minimizes the expected total sample size under \(H_0\),
- respects
n1_min = c(10, 10) and
n2_max = c(80, 80), i.e. a minimum of 10 and a maximum of
80 patients per trial arm, and
- uses the same design and analysis priors as in the fixed-sample
comparator.
We implement this by calling design_twoarm_twostage_bf()
with Bayesian calibration:
res_rio <- design_twoarm_twostage_bf(
n1_min = c(10, 10),
n2_max = c(80, 80),
alloc1 = 0.5,
alloc2 = 0.5,
k = 1/10,
k_f = 3,
test = "BF+0",
calibration = "Bayesian",
calibration_en = "Bayesian",
target_power = 0.8,
target_type1 = 0.025,
target_ce_h0 = 0.60,
power_cushion = 0.03,
interim_fraction = c(0, 1),
grid_step = 1L,
coarse_step = 10L,
max_iter = 500L,
ncores = 1L,
progress = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = a_1_d_rio, b_1_d = b_1_d_rio,
a_2_d = a_2_d_rio, b_2_d = b_2_d_rio,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
Step 1: searching for fixed-sample sufficiency (alpha=0.025, beta=0.2, cushion=0.03)...
Step 1: coarse fixed-sample search...
Coarse grid[ 1]: n_tot= 20 | n1= 10 n2= 10 | Bayes Power=0.631 | Bayes T1E=0.010 | PCE(H0)=0.449
Coarse grid[ 2]: n_tot= 30 | n1= 15 n2= 15 | Bayes Power=0.703 | Bayes T1E=0.008 | PCE(H0)=0.512
Coarse grid[ 3]: n_tot= 40 | n1= 20 n2= 20 | Bayes Power=0.751 | Bayes T1E=0.006 | PCE(H0)=0.565
Coarse grid[ 4]: n_tot= 50 | n1= 25 n2= 25 | Bayes Power=0.786 | Bayes T1E=0.006 | PCE(H0)=0.617
Coarse grid[ 5]: n_tot= 60 | n1= 30 n2= 30 | Bayes Power=0.812 | Bayes T1E=0.006 | PCE(H0)=0.646
Coarse grid[ 6]: n_tot= 70 | n1= 35 n2= 35 | Bayes Power=0.834 | Bayes T1E=0.006 | PCE(H0)=0.660
Refining fixed-sample search on [60, 70]...
Refine n_tot= 60 | n1= 30 n2= 30 | Bayes Power=0.812 | Bayes T1E=0.006 | PCE(H0)=0.646
Refine n_tot= 62 | n1= 31 n2= 31 | Bayes Power=0.819 | Bayes T1E=0.006 | PCE(H0)=0.650
Refine n_tot= 64 | n1= 32 n2= 32 | Bayes Power=0.822 | Bayes T1E=0.005 | PCE(H0)=0.653
Refine n_tot= 66 | n1= 33 n2= 33 | Bayes Power=0.829 | Bayes T1E=0.006 | PCE(H0)=0.656
Refine n_tot= 68 | n1= 34 n2= 34 | Bayes Power=0.833 | Bayes T1E=0.006 | PCE(H0)=0.658
--> Fixed-sample size found: n_tot=68 (n1=34, n2=34, Power=0.833, T1E=0.006, PCE(H0)=0.658)
=> Parallelizing over 24 interim designs using 1 cores...
Step 2: evaluated 10 / 24 interim designs (41.7%)...
Step 2: evaluated 20 / 24 interim designs (83.3%)...
Step 2: evaluated 24 / 24 interim designs (100.0%)...
The console output from this call mirrors the two-step calibration
performed by the internal engine
optimal_twostage_2arm_bf():
- Step 1 performs a coarse and then refined fixed-sample search over
total sample sizes, reporting Bayesian power, type-I error, and CE(H0)
at each candidate and identifying a sufficient fixed-sample anchor
(here, \(n_2^{(1)} = n_2^{(2)} =
34\)).
- Step 2 constructs the grid of admissible interim designs \((n_1^{(1)}, n_1^{(2)})\) consistent with
n1_min, the fixed-sample anchor, and
interim_fraction, then evaluates each grid point, filters
for feasibility, and selects the design that minimizes the expected
sample size under \(H_0\).
With
interim_fraction = c(0, 1)
n1_min = c(10, 10)
the interim sample size in each arm is allowed to range from 10 up to
33 (because the interim look must occur strictly before the final size
of 34 patients per arm). In principle this yields
- \(n_1^{(1)} \in \{10, 11, \dots,
33\}\),
- \(n_1^{(2)} \in \{10, 11, \dots,
33\}\),
so a \(24 \times 24\) grid of
candidate interim designs. Internally, the algorithm filters this grid
to the subset of candidates that satisfy basic consistency conditions
and can be meaningfully evaluated, which is why the progress output
reports a smaller number of interim designs being parallelised in this
run. Choosing interim_fraction = c(0.25, 0.75) would
restrict the interim analysis to occur between 25% and 75% of the
fixed-sample size, which can reduce the grid size and runtime in large
problems.
The resulting design object res_rio collects both the
fixed-sample anchor from step 1 and the corrected two-stage operating
characteristics of the final design:
res_rio$design is a four-element vector
c(n1_1, n1_2, n2_1, n2_2) describing the optimal two-stage
design. In this example:
res_rio$design
#> n1_1 n1_2 n2_1 n2_2
#> 10 10 34 34
so the interim sample sizes are \(n_1^{(1)}
= n_1^{(2)} = 10\) and the final sample sizes are \(n_2^{(1)} = n_2^{(2)} = 34\).
The maximum total sample size is therefore \[
N_{\max} = n_2^{(1)} + n_2^{(2)} = 68,
\] and the interim total sample size (at the
interim analysis) is \[
N_{\mathrm{int}} = n_1^{(1)} + n_1^{(2)} = 20.
\]
res_rio$fixed_design contains the fixed-sample
anchor identified in step 1 (here also c(34, 34)), and
res_rio$fixed_operating_characteristics summarises its
operating characteristics (Bayesian power, type-I error and CE(H0), plus
frequentist quantities if requested).
res_rio$operating_characteristics contains the
corrected operating characteristics of the optimal
two-stage design:
res_rio$operating_characteristics
#> $power
#> 0.8330913
#>
#> $type1
#> 0.005831181
#>
#> $ce_h0
#> 0.6927951
#>
#> $en_bayes
#> 66.04139
#>
#> $freq_type1
#> NA
#>
#> $freq_power
#> NA
#>
#> $en_freq
#> NA
Here, power is the Bayesian power under the design
prior, accounting for early stopping for futility; type1 is
the corrected Bayesian type-I error; ce_h0 is the corrected
probability of compelling evidence for \(H_0\); and en_bayes is the
expected total sample size under \(H_0\). Optional frequentist measures are
reported when the calibration includes frequentist constraints.
res_rio$optimizer$conv indicates whether a feasible
design satisfying the specified constraints was found in the search
region; in this example the convergence flag equals
"converged".
In summary, res_rio$design tells us how many patients
are recruited in each arm at the interim and at the final analysis, and
res_rio$operating_characteristics reports the corresponding
operating characteristics of the optimal two-stage design.
The design object can be inspected via
Summary: two-stage two-arm Bayes factor design
---------------------------------------------
Mode: optimal
Status: converged
Calibration: Bayesian
Convergence flag: converged
Feasible: yes
Selected design
n1 = (10, 10), n2 = (34, 34)
and plotted using the wrapper’s plot method:
Figure 3 also visualises our expectations about the effect of the
drug. The design priors indicate that smaller response probabilities
close to zero are much more likely a priori in the control group than in
the treatment group, whereas larger response probabilities are more
likely in the treatment group (compare the dashed and solid lines in the
design-prior panels for \(H_+\): \(p_1\) is the success probability in the
control arm and \(p_2\) the success
probability in the treatment arm). This expectation about the
effectiveness of the new treatment is independent of the analysis priors
used when computing the Bayes factor \(BF_{+0}\), which are flat and in that sense
objective: subjectivity enters the planning stage of the trial, not the
interim or final analysis itself.
Comparison with the
fixed-sample design
Before considering the two-stage design, it is useful to look again
at the corresponding one-stage fixed-sample design that we calibrated
earlier directly to the target Bayesian operating characteristics. For
the riociguat example, the function
design_twoarm_onestage_bf() with
target_power = 0.8, target_type1 = 0.025 and
target_ce_h0 = 0.6 identified a fixed-sample one-stage
design with \(N_{\text{total}} = 53\)
patients in total. At this sample size the Bayesian power is
approximately \(0.80\), the Bayesian
type-I error under \(H_0\) is about
\(0.0099\), and the probability of
obtaining compelling evidence in favour of \(H_0\) is about \(0.62\). These values correspond to the row
in the fixed-sample calibration console output above in Section 6.2,
when setting progress = TRUE in the function call.
The optimal two-stage design returned by
design_twoarm_twostage_bf() for the same calibration
targets uses larger final sample sizes, \(n_2^{(1)} = n_2^{(2)} = 34\), so that the
maximum total sample size is \(N_{\text{total}} = 68\). However, it
introduces an interim analysis at \((n_1^{(1)}, n_1^{(2)}) = (10, 10)\) with
the option to stop early for futility under \(H_0\). The corrected two-stage operating
characteristics of this design are close to the one-stage targets: the
Bayesian power is about \(0.83\), the
corrected Bayesian type-I error under \(H_0\) is about \(0.006\), and the corrected probability of
compelling evidence in favour of \(H_0\) is approximately \(0.69\). At the same time, the two-stage
design stops early for futility under \(H_0\) with probability about \(0.04\), which reduces the expected total
sample size under \(H_0\) from 68 in
the corresponding one-stage design to roughly \(E_{H_0}N \approx 66.04\).
The following table summarizes the key Bayesian operating
characteristics of the fixed-sample one-stage design at \(N_{\text{total}} = 53\) and of the optimal
two-stage design with interim look at \((n_1^{(1)}, n_1^{(2)}) = (10, 10)\) and
maximum total sample size \(N_{\text{total}} =
68\).
Bayesian operating characteristics of the fixed-sample
one-stage design at \(N_{\text{total}} = 53\) and the corresponding
optimal two-stage design with interim look at \((n_1^{(1)}, n_1^{(2)}) =
(10, 10)\) and maximum total sample size \(N_{\text{total}} = 68\) for
the riociguat example.
| One-stage (fixed) |
- |
- |
~26 |
~27 |
53 |
0.80 |
0.007 |
0.62 |
53.0 |
| Two-stage (optimal) |
10 |
10 |
34 |
34 |
68 |
0.83 |
0.006 |
0.69 |
66.04 |
Interpretation of the
small futility probability
In the riociguat example, the optimal two-stage design only stops
early for futility under \(H_0\) with
probability about \(0.04\), so the
reduction in the expected sample size under \(H_0\) is very modest. This behaviour is not
a bug of the algorithm, but a consequence of the modelling choices and
calibration constraints.
First, the design is calibrated to fairly strict evidence
requirements: the success threshold \(k =
1/10\), the null-evidence threshold \(k_f = 3\), the Bayesian type-I error bound
\(\alpha = 0.025\), and the requirement
\(\Pr(\mathrm{CE}\mid H_0) \ge 0.60\)
together imply that only a small fraction of \(H_0\) outcomes can be eliminated safely at
the interim look without compromising either power or the probability of
compelling evidence in favour of \(H_0\). Under such constraints, the interim
boundary cannot be very aggressive, so the early stopping probability
under \(H_0\) remains low and \(E_{H_0}(N)\) stays close to the maximum
sample size.
Second, even when the interim fraction is moved and the CE\((H_0)\) target is varied, the futility
probability in this example is relatively insensitive as long as the
thresholds \(k\) and \(k_f\) and the overall calibration targets
remain fixed. Moving the interim later increases the information
available at the interim, but the futility rule still has to preserve
about 80% Bayesian power and the CE\((H_0)\) constraint, which limits how many
null paths can be stopped early. In particular, with \(k_f = 3\) already fairly liberal for
declaring strong evidence in favour of \(H_0\), further gains in early stopping
would require relaxing this threshold in a way that is not clinically
desirable here.
Third, the design priors have a pronounced effect on the expected
sample size under \(H_0\). When the
design priors under \(H_1^+\) are made
more informative and more clearly separated from \(H_0\), the predictive distributions under
\(H_0\) and \(H_1^+\) diverge more quickly as the sample
size grows. This leads to a smaller sufficient fixed-sample size and,
consequently, to a smaller expected sample size under \(H_0\) in the corresponding two-stage
design, even if the interim futility probability itself changes only
marginally. In the riociguat example, this can be achieved by
concentrating the design priors slightly more around the clinically
relevant success rates, while keeping the analysis priors and Bayes
factor thresholds unchanged.
To illustrate this effect, consider a modified design where the
analysis priors are left as in the original example, but the design
priors under \(H_1^+\) are made more
informative, with \(\mathrm{Beta}(1,
5)\) for the control arm and \(\mathrm{Beta}(5, 1)\) for the experimental
arm. Using the call
res_rio_more_informative_design_priors <- design_twoarm_twostage_bf(
n1_min = c(10, 10),
n2_max = c(80, 80),
alloc1 = 0.5,
alloc2 = 0.5,
k = 1/10,
k_f = 3,
test = "BF+0",
calibration = "Bayesian",
calibration_en = "Bayesian",
target_power = 0.8,
target_type1 = 0.025,
target_ce_h0 = 0.60,
power_cushion = 0.03,
interim_fraction = c(0, 1),
grid_step = 1L,
coarse_step = 10L,
max_iter = 500L,
ncores = 1L,
progress = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = 1, b_1_d = 5,
a_2_d = 5, b_2_d = 1,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
plot(res_rio_more_informative_design_priors)
the fixed-sample calibration in step 1 now finds a sufficient
one-stage design with \(n_2^{(1)} = n_2^{(2)}
= 13\) (i.e. \(N_{\text{total}} =
26\)). Conditional on this fixed-sample anchor, the optimal
two-stage design has interim and final sample sizes
\[
(n_1^{(1)}, n_1^{(2)}, n_2^{(1)}, n_2^{(2)}) = (10, 10, 13, 13),
\]
with corrected Bayesian operating characteristics
\[
\Pr(\text{Reject } H_0 \mid H_1^+) \approx 0.8531,\quad
\Pr(\text{Reject } H_0 \mid H_0) \approx 0.0079,\quad
\Pr(\mathrm{CE} \mid H_0) \approx 0.4821,
\]
and an early futility stop probability under \(H_0\) of about \(0.040\). The expected total sample size
under \(H_0\) is reduced to
\[
E_{H_0}N \approx 25.76,
\]
which is still close to the maximum sample size \(N_{\text{total}} = 26\) but much smaller
than in the original riociguat example. This illustrates that, in this
family of designs, meaningful gains in efficiency are driven primarily
by how informative and well-separated the design priors are under \(H_0\) and \(H_1^+\), rather than by aggressive changes
to the interim timing or thresholds, which would otherwise conflict with
the desired power and evidence constraints. It is important to stress
that choosing a slightly more informative design prior under \(H_+\) does not introduce any form of
subjectivity in the eventual analysis carried out when the trial data
are available: The analysis priors used in the Bayes factors remain flat
and in that sense objective. The only thing that changes is our a priori
expectation about the effect of the treatment or drug to a slightly more
optimistic assumption (compare the design prior panels for \(H_+\) in the two function calls above, in
the last one the priors separate the hypotheses slightly stronger from
another).
Another important distinction to make conceptually is the reduction
in sample size in expectation versus the reduction in
sample size in a single trial. The former might seem
quite small as the introduction of the interim analysis only reduces the
expected sample size about one patient compared to the maximum sample
size. The reason is the small probability of stopping early for
futility. However, in a single trial, the reduction in sample size when
the trial indeed stops for futility, is 26 patients compared to
continuing the trial, which is substantial. Even when comparing the
expected sample size of the optimal Bayesian trial with interim analysis
to the one of the fixed-sample Bayesian design without an interim
analysis, the reduction is substantial. To allow for a fair comparison,
we refit the one-stage two-arm design with the same more informative
design priors first:
cat("\n--- One-stage design calibration for riociguat-type trial ---\n")
res_rio_onestage_informative_designpriors <- design_twoarm_onestage_bf(
n_min = 10,
n_max = 80,
k = 1/10,
k_f = 3,
test = "BF+0",
alloc1 = 0.5,
alloc2 = 0.5,
calibration = "Bayesian",
target_power = 0.8,
target_type1 = 0.025,
target_ce_h0 = 0.60,
target_freq_power = 0.8,
target_freq_type1 = 0.025,
p1_grid = seq(0.01, 0.99, 0.02),
p2_grid = seq(0.01, 0.99, 0.02),
p1_power = 0.4,
p2_power = 0.6,
power_cushion = 0,
sustain_n = 10L,
algorithm = "optimal",
progress = FALSE,
report_freq_type1 = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = 1, b_1_d = 6,
a_2_d = 6, b_2_d = 1,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
summary(res_rio_onestage_informative_designpriors)
Summary: One-stage two-arm Bayes factor design
---------------------------------------------
Mode: optimal
Status: Smallest feasible one-stage two-arm design found.
Calibration: Bayesian
Feasible: yes
Search overview
n evaluated = 71
pointwise feasible = 37
sustained feasible = 36
first pointwise n = 43
first sustained n = 45
Selected design
n_total = 45, n1 = 22, n2 = 23
Thus, we obtain \(n=45\) as the
total sample size for the calibrated one-stage two-arm design with more
informative design priors. This implies both the one-stage and two-stage
optimal design have about the same sample size in expectation (53
patients in expectation in the fixed-sample design vs. 44.94 in the
optimal two-stage design). However, the two-stage design might stop for
futility, which then reduces the required sample size substantially in
those cases.
A note on the
expected sample size
In this subsection we show, that shifting to a two-stage design does
not necessarily reduce the expected sample size (under the null
hypothesis). When comparing the one-stage design and a possible
two-stage design with a single interim analysis which can stop for
futility, it is thus important to check which factors influence the
expected sample size under \(H_0\) in
the two-stage optimal design.
If a design is desired which reduces the expected sample size
compared to the one-stage design with identical priors, the most helpful
parameter to tune is the probability of compelling evidence target
constraint \[P(BF_{01}>k_f|H_0)>f.\] The reason
is straightforward: There are two kind of trajectories which contribute
to the probability of compelling evidence for \(H_0\):
- Trajectories which lead to at least evidence \(k_f\) in the final analysis with total
sample size \(N_2\)
- Trajectories which lead to at least evidence \(k_f\) in the interim analysis with total
sample size \(N_1\)
where \(N_1=n_1^{(1)}+n_1^{(2)}\)
and \(N_2=n_2^{(1)}+n_2^{(2)}\) are the
total sample sizes at interim and final analysis.
For a fixed futility evidence threshold \(k_f\) and fixed design priors, a larger
target constraint \(f>0\) on the
probability of compelling evidence \(P(BF_{01}>k_f|H_0)>f\) implies that
the number of trajectories of the two kinds above must increase.
- When the number of trajectories with compelling evidence \(k_f\) for \(H_0\) at the final analysis should
increase, \(N_2\) must increase. Then,
the data can accumulate more evidence in favour of \(H_0\) when \(H_0\) is indeed true.
- Likewise, when the number of trajectoris with compelling evidence
\(k_f\) for \(H_0\) at the interim analysis should
increase, \(N_1\) must increase. Then,
the data an accumulate more evidence in favour of \(H_0\) so that the interim analysis can
express at least evidence \(k_f\) in
favour of \(H_0\), when \(H_0\) is indeed true.
In summary, increasing the target constraing \(f\) leads to an increase both in \(N_1\) and \(N_2\). As the expected sample size is given
as \[E_{H_0}[N]=N_1\cdot P_{H_0}\text{(stop
for futility at interim)}+N_2\cdot P_{H_0}\text{(continue to stage
2)}\] this implies that increasing \(f\) increases \(E_{H_0}[N]\).
The reverse also holds: Decreasing or entirely removing \(f\) (that is, no condition on the
probability of compelling evidence) implies that \(N_1\) can decrease.
For illustration purposes, consider again the design with more
informative design priors. We remove the condition of 60% compelling
evidence for \(H_0\) entirely by
removing the argument target_ce_h0 = 0.60:
res_rio_more_informative_design_priors_no_ce <- design_twoarm_twostage_bf(
n1_min = c(10, 10),
n2_max = c(80, 80),
alloc1 = 0.5,
alloc2 = 0.5,
k = 1/10,
k_f = 3,
test = "BF+0",
calibration = "Bayesian",
calibration_en = "Bayesian",
target_power = 0.8,
target_type1 = 0.025,
power_cushion = 0.03,
interim_fraction = c(0, 1),
grid_step = 1L,
coarse_step = 10L,
max_iter = 500L,
ncores = 1L,
progress = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = 1, b_1_d = 5,
a_2_d = 5, b_2_d = 1,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
Step 1: searching for fixed-sample sufficiency (alpha=0.025, beta=0.2, cushion=0.03)...
Step 1: coarse fixed-sample search...
Coarse grid[ 1]: n_tot= 20 | n1= 10 n2= 10 | Bayes Power=0.815 | Bayes T1E=0.010 | PCE(H0)=0.449
Coarse grid[ 2]: n_tot= 30 | n1= 15 n2= 15 | Bayes Power=0.870 | Bayes T1E=0.008 | PCE(H0)=0.512
Refining fixed-sample search on [20, 30]...
Refine n_tot= 20 | n1= 10 n2= 10 | Bayes Power=0.815 | Bayes T1E=0.010 | PCE(H0)=0.449
Refine n_tot= 22 | n1= 11 n2= 11 | Bayes Power=0.813 | Bayes T1E=0.008 | PCE(H0)=0.436
Refine n_tot= 24 | n1= 12 n2= 12 | Bayes Power=0.826 | Bayes T1E=0.006 | PCE(H0)=0.450
Refine n_tot= 26 | n1= 13 n2= 13 | Bayes Power=0.853 | Bayes T1E=0.008 | PCE(H0)=0.461
--> Fixed-sample size found: n_tot=26 (n1=13, n2=13, Power=0.853, T1E=0.008, PCE(H0)=0.461)
=> Parallelizing over 3 interim designs using 1 cores...
Step 2: evaluated 3 / 3 interim designs (100.0%)...
We inspect the fit:
summary(res_rio_more_informative_design_priors_no_ce)
Summary: two-stage two-arm Bayes factor design
---------------------------------------------
Mode: optimal
Status: converged
Calibration: Bayesian
Convergence flag: converged
Feasible: yes
Selected design
n1 = (10, 10), n2 = (13, 13)
We can see that the sample size \(N_2=13+13=26\) decreased substantially. We
could also set n1_min = c(10,10) to smaller values when
calling the function and see that the interim sample size then also
decreases. We inspect the plot:
plot(res_rio_more_informative_design_priors_no_ce)
We now see that the expected sample size has reduced from \(E_{H_0}[N]=44.94\) to only \(E_{H_0}[N]=25.76\), which is about half the
sample size of the one-stage design and the previous optimal two-stage
design. For a fair comparison with the corresponding one-stage design,
we refit the latter also after removing the probability of compelling
evidence condition:
res_rio_onestage_informative_designpriors_no_ce <- design_twoarm_onestage_bf(
n_min = 10,
n_max = 80,
k = 1/10,
k_f = 3,
test = "BF+0",
alloc1 = 0.5,
alloc2 = 0.5,
calibration = "Bayesian",
target_power = 0.8,
target_type1 = 0.025,
target_freq_power = 0.8,
target_freq_type1 = 0.025,
p1_grid = seq(0.01, 0.99, 0.02),
p2_grid = seq(0.01, 0.99, 0.02),
p1_power = 0.4,
p2_power = 0.6,
power_cushion = 0,
sustain_n = 10L,
algorithm = "optimal",
progress = FALSE,
report_freq_type1 = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = 1, b_1_d = 5,
a_2_d = 5, b_2_d = 1,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
summary(res_rio_onestage_informative_designpriors_no_ce)
Summary: One-stage two-arm Bayes factor design
---------------------------------------------
Mode: optimal
Status: Smallest feasible one-stage two-arm design found.
Calibration: Bayesian
Feasible: yes
Search overview
n evaluated = 71
pointwise feasible = 61
sustained feasible = 61
first pointwise n = 20
first sustained n = 20
Selected design
n_total = 20, n1 = 10, n2 = 10
We see that the one-stage design yields an expected sample size of
\(20\) patients in that case. Thus, the
introduction of the interim analysis costs about \(5\) patients in expectation.
Reducing the expected
sample size substantially
The last subsection illustrated that a two-stage design does not
necessarily reduce the expected sample size under \(H_0\) compared to the one-stage design
which does not include an interim analysis which allows to stop the
trial early for futility. In this subsection we revisit the riociguat
example and compare a one-stage and a two-stage Bayes-factor design
under slightly informative design priors. The aim is to
demonstrate that, with appropriate calibration (in particular, without
an additional power cushion in the fixed-sample anchor), the two-stage
design can achieve a smaller expected sample size under \(H_0\) than the corresponding
one-stage design, while maintaining the same Bayesian power and type-I
error targets.
We consider a two-arm phase II setting with binary endpoints and the
directional Bayes factor \(BF_{+0}\),
using the riociguat-inspired priors described earlier (control arm
centred near 0.4, experimental arm near 0.6). Both designs are
calibrated to Bayesian power 0.9 and Bayesian
type-I error 0.025 under these design priors.
One-stage
design
We first calibrate an optimal one-stage two-arm Bayes-factor design
using design_twoarm_onestage_bf() with Bayesian
calibration:
res_rio_onestage_mod <- design_twoarm_onestage_bf(
n_min = 10,
n_max = 160,
k = 1/10,
k_f = 3,
test = "BF+0",
alloc1 = 0.5,
alloc2 = 0.5,
calibration = "Bayesian",
target_power = 0.9,
target_type1 = 0.025,
target_ce_h0 = 0,
target_freq_power = 0.8,
target_freq_type1 = 0.025,
p1_grid = seq(0.01, 0.99, 0.02),
p2_grid = seq(0.01, 0.99, 0.02),
p1_power = 0.4,
p2_power = 0.6,
sustain_n = 10L,
algorithm = "optimal",
progress = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = 1, b_1_d = 3,
a_2_d = 3, b_2_d = 1,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
Printing the resulting design:
print(res_rio_onestage_mod)
yields:
One-stage two-arm Bayes factor design
------------------------------------
Mode: optimal
Status: Smallest feasible one-stage two-arm design found.
Calibration: Bayesian
Optional freq. Type-I reporting: off
Design: n_total = 154, n1 = 77, n2 = 77
Operating characteristics
Power = 0.9014
Type-I error = 0.0041
CE(H0) = 0.7749
Freq. Power = 0.4956
Under these design priors and targets, the calibrated one-stage
design requires a total sample size of 154 patients (77
per arm).
plot(res_rio_onestage_mod)
Two-stage design
without power cushion
We now construct a two-stage design using the same design and
analysis priors and the same Bayesian targets, via
design_twoarm_twostage_bf(). In contrast to earlier runs,
we set power_cushion = 0, so that the fixed-sample anchor
in step 1 of the calibration algorithm is calibrated to exactly 90%
Bayesian power (rather than a larger value). Otherwise, the fixed-sample
anchor found in step 1 of the algorithm drives up the expected sample
size under \(H_0\) considerably:
res_rio_twostage_anchor_near <- design_twoarm_twostage_bf(
n1_min = c(10, 10),
n2_max = c(150, 150),
alloc1 = 0.5,
alloc2 = 0.5,
k = 1/10,
k_f = 3,
test = "BF+0",
calibration = "Bayesian",
calibration_en = "Bayesian",
target_power = 0.9,
target_type1 = 0.025,
target_ce_h0 = 0, # CE(H0) not constrained in step 1
target_freq_power = 0.8,
target_freq_type1 = 0.025,
power_cushion = 0, # crucial for matching the anchor
interim_fraction = c(0, 1),
grid_step = 1L,
coarse_step = 10L,
max_iter = 500L,
ncores = 9,
progress = TRUE,
a_0_d = a_0_d_rio, b_0_d = b_0_d_rio,
a_0_a = a_0_a_rio, b_0_a = b_0_a_rio,
a_1_d = 1, b_1_d = 3,
a_2_d = 3, b_2_d = 1,
a_1_a = a_1_a_rio, b_1_a = b_1_a_rio,
a_2_a = a_2_a_rio, b_2_a = b_2_a_rio
)
The step 1 output shows that the fixed-sample anchor lands very close
to the one-stage solution:
Step 1: searching for fixed-sample sufficiency (alpha=0.025, beta=0.1, cushion=0)...
Step 1: coarse fixed-sample search...
Coarse grid[ 1]: n_tot= 20 | n1= 10 n2= 10 | Bayes Power=0.631 | Bayes T1E=0.010 | PCE(H0)=0.449
Coarse grid[ 2]: n_tot= 30 | n1= 15 n2= 15 | Bayes Power=0.703 | Bayes T1E=0.008 | PCE(H0)=0.512
Coarse grid[ 3]: n_tot= 40 | n1= 20 n2= 20 | Bayes Power=0.751 | Bayes T1E=0.006 | PCE(H0)=0.565
Coarse grid[ 4]: n_tot= 50 | n1= 25 n2= 25 | Bayes Power=0.786 | Bayes T1E=0.006 | PCE(H0)=0.617
Coarse grid[ 5]: n_tot= 60 | n1= 30 n2= 30 | Bayes Power=0.812 | Bayes T1E=0.006 | PCE(H0)=0.646
Coarse grid[ 6]: n_tot= 70 | n1= 35 n2= 35 | Bayes Power=0.834 | Bayes T1E=0.006 | PCE(H0)=0.660
Coarse grid[ 7]: n_tot= 80 | n1= 40 n2= 40 | Bayes Power=0.850 | Bayes T1E=0.005 | PCE(H0)=0.701
Coarse grid[ 8]: n_tot= 90 | n1= 45 n2= 45 | Bayes Power=0.860 | Bayes T1E=0.005 | PCE(H0)=0.717
Coarse grid[ 9]: n_tot=100 | n1= 50 n2= 50 | Bayes Power=0.868 | Bayes T1E=0.005 | PCE(H0)=0.728
Coarse grid[ 10]: n_tot=110 | n1= 55 n2= 55 | Bayes Power=0.877 | Bayes T1E=0.005 | PCE(H0)=0.744
Coarse grid[ 11]: n_tot=120 | n1= 60 n2= 60 | Bayes Power=0.884 | Bayes T1E=0.004 | PCE(H0)=0.751
Coarse grid[ 12]: n_tot=130 | n1= 65 n2= 65 | Bayes Power=0.889 | Bayes T1E=0.004 | PCE(H0)=0.766
Coarse grid[ 13]: n_tot=140 | n1= 70 n2= 70 | Bayes Power=0.896 | Bayes T1E=0.004 | PCE(H0)=0.784
Coarse grid[ 14]: n_tot=150 | n1= 75 n2= 75 | Bayes Power=0.899 | Bayes T1E=0.004 | PCE(H0)=0.777
Coarse grid[ 15]: n_tot=160 | n1= 80 n2= 80 | Bayes Power=0.903 | Bayes T1E=0.004 | PCE(H0)=0.780
Refining fixed-sample search on [150, 160]...
Refine n_tot=150 | n1= 75 n2= 75 | Bayes Power=0.899 | Bayes T1E=0.004 | PCE(H0)=0.777
Refine n_tot=152 | n1= 76 n2= 76 | Bayes Power=0.900 | Bayes T1E=0.004 | PCE(H0)=0.776
--> Fixed-sample size found: n_tot=152 (n1=76, n2=76, Power=0.900, T1E=0.004, PCE(H0)=0.776)
=> Parallelizing over 66 interim designs using 9 cores...
Step 2: evaluated 10 / 66 interim designs (15.2%)...
Step 2: evaluated 20 / 66 interim designs (30.3%)...
Step 2: evaluated 30 / 66 interim designs (45.5%)...
Step 2: evaluated 40 / 66 interim designs (60.6%)...
Step 2: evaluated 50 / 66 interim designs (75.8%)...
Step 2: evaluated 60 / 66 interim designs (90.9%)...
Step 2: evaluated 66 / 66 interim designs (100.0%)...
plot(res_rio_twostage_anchor_near)
Printing the resulting two-stage design:
print(res_rio_twostage_anchor_near)
gives:
Optimal two-stage two-arm Bayes factor design
------------------------------------
Mode: optimal
Status: converged
Calibration: Bayesian
Convergence flag: converged
Design: n1 = (12, 12), n2 = (76, 76)
Corrected operating characteristics
Power = 0.9002
Type-I error = 0.0030
CE(H0) = 0.8155
EN (Bayesian) = 146.57
Thus, relative to the one-stage design:
- The one-stage design has \(n_{\text{tot}} = 154\) and uses all 154
patients under \(H_0\).
- The two-stage design has a maximum sample size of
\(n_{\text{tot}} = 152\) (76 per arm),
but includes an interim look at \(n_1 = (12,
12)\), and achieves a Bayesian expected sample size under
\(H_0\) of about
146.6.
Both designs satisfy the same Bayesian power and type-I error
constraints under the chosen design priors, but the two-stage design
reduces the expected sample size under the null and
simultaneously increases \(\mathrm{CE}_{H_0}\) from 0.775 to 0.816.
This illustrates that, once the fixed-sample anchor is not inflated by
an additional power cushion, the two-stage Bayes-factor design can
provide genuine efficiency gains in this riociguat-inspired setting.
A subtle but practically relevant point in this example is that the
fixed-sample anchor identified in step 1 of the two-stage calibration
(152 patients in total, 76 per arm) does not exactly coincide with the
smallest feasible one-stage design returned by the one-stage calibration
function design_twoarm_onestage_bf() (154 patients in
total, 77 per arm). This is not due to the \(\mathrm{CE}_{H_0}\) constraint, which is
set to zero and thus inactive here, but reflects two technical aspects
of the calibration: first, the Bayesian power and type-I-error functions
under the beta–binomial design priors are not strictly monotone in the
total sample size on the integer grid; second, the one-stage wrapper
enforces sustained feasibility over a grid of \((p_1,p_2)\) values (for Bayesian
type-I-error control) via the sustain_n argument, whereas
the two-stage engine in step 1 only requires a single fixed-sample size
to meet the marginal Bayesian targets. Thus, there is no active sustain
parameter at work in this first step, and such a parameter also makes
little sense for the eventually selected two-stage design, because there
the interplay between interim analysis positioning and oscillations of
operating characteristics in the beta-binomial model make any form of a
sustain logic unapplicable. Together with small oscillations in the
grid-based beta–binomial calculations, this can lead to a situation
where step 1 of the two-stage algorithm accepts \(n_2^{(1)} = n_2^{(2)} = 76\) as a
sufficient fixed-sample anchor, while the one-stage search reports \(n_1 = n_2 = 77\) as the smallest
sustained-feasible design. Conditional on this anchor, the two-stage
design then preserves the desired Bayesian power and type-I error and
achieves a smaller expected sample size under \(H_0\).
Interpretation of the
conv flag
The component conv in the output of
optimal_twostage_2arm_bf() summarizes how the calibration
algorithm terminated.
"converged"
A fully feasible design was found: step 1 identified a fixed-sample
design that meets the Bayesian constraints, and step 2 found at least
one two-stage design on the interim grid whose corrected operating
characteristics satisfy the specified targets. The returned design is
the one that minimizes the expected sample size under \(H_0\) among all such candidates.
"no_feasible_fixed"
Step 1 could not find any fixed-sample design (within the range implied
by n1_min, n2_max, max_iter, and
the thresholds) that satisfies the Bayesian constraints. In this case
step 2 is not entered at all, because there is no “sufficient” one-stage
design to base a two-stage search on. Typical remedies are to relax the
constraints (e.g. increase alpha, relax pceH0,
or reduce 1 - beta) or to increase n2_max and
max_iter.
"no_interim_grid"
A fixed-sample design was found in step 1, but the admissible
interim-sample region implied by n1_min,
n2_max, and interim_fraction is empty. In
other words, there is no pair \((n_1^{(1)},
n_1^{(2)})\) that both lies strictly below \((n_2^{(1)}, n_2^{(2)})\) and satisfies the
interim-range constraints. In this case the algorithm cannot construct
any two-stage candidates. Adjusting n1_min or widening
interim_fraction usually resolves this.
"no_feasible_design"
Both step 1 and step 2 ran, and at least one interim grid was evaluated,
but no two-stage design on that grid satisfies the specified constraints
on power, type-I error, and (optionally) pceH0. The
function returns NA for the design and corrected operating
characteristics in this case. To obtain a feasible design, one can
enlarge the search space (e.g. increase n2_max or allow a
finer grid via grid_step) or relax the Bayesian
constraints.
How priors and
thresholds affect the calibration grid (and runtime)
Design priors and
required sample size
The design priors under \(H_0\) and
\(H_1\) determine how quickly the Bayes
factor accumulates evidence as \(n\)
increases.
Flat design priors (e.g. \(\mathrm{Beta}(1,1)\) everywhere) spread
substantial prior mass over a wide range of response rates. Under such
diffuse priors, the Bayes factor tends to move more slowly away from 1,
and the algorithm typically needs a larger fixed-sample
size in step 1 to achieve the desired power and type-I error
under the design priors. We strongly discourage using flat priors solely
for the sake of staying objective, in particular, because the design
priors do not influence the results of the Bayes factor. This is the job
of the analysis prior in the planning of a trial and here, we encourage
using uninformative or flat analysis priors.
More informative design priors that concentrate
mass near clinically plausible values can lead to smaller
sufficient fixed-sample sizes, because the predictive
distributions under \(H_0\) and \(H_1\) separate more quickly.
Because a larger fixed-sample size directly expands the admissible
range for \((n_1^1, n_1^2)\), using
very flat design priors can lead to a very large interim design
grid in step 2 and thus considerably longer runtimes.
Evidence threshold
\(k\) and required sample size
The efficacy threshold \(k\) determines how strong the evidence
against \(H_0\) must be before
declaring success. For BF+0, success corresponds to the event “Bayes
factor in favour of \(H_+\) vs \(H_0\) drops below \(k\)”.
If \(k\) is very small
(e.g. \(k = 1/10\)), then very strong
evidence is required to reject \(H_0\).
This typically forces the algorithm to choose larger
fixed-sample sizes to reach the desired power.
If \(k\) is less extreme
(e.g. \(k = 1/3\)), the evidence
threshold is easier to reach, so smaller fixed-sample
sizes can be sufficient.
Since the fixed-sample size from step 1 determines the upper bound
for the interim sample sizes, choosing a larger (less
stringent) \(k\) tends to
reduce the number of interim designs and the runtime of
the calibration procedure; choosing a smaller \(k\) has the opposite effect.
Probability of
compelling evidence for \(H_0\) and
feasibility
The optional constraint on \(\Pr(\mathrm{CE}\mid H_0)\) (specified via
pceH0) is evaluated under \(H_0\) and requires a sufficiently
large sample size for the Bayes factor to accumulate
strong evidence in favour of \(H_0\). For small total sample sizes:
It may be impossible to reach the desired pceH0
(even with favourable data), because the Bayes factor cannot move far
enough towards \(H_0\) when \(n\) is small.
In such cases, the fixed-sample search in step 1 will typically
continue to larger \(n\) in an attempt
to meet the pceH0 constraint. If n2_max is
restrictive, it may ultimately fail to find a design
that satisfies all constraints.
This leads to an important tension:
Smaller sufficient fixed-sample sizes (e.g. from
a less stringent \(k\)) make the step-2
search faster but can make it hard (or impossible) to
reach a demanding pceH0 (such as 0.8 or 0.9), because there
simply is not enough information in the data to strongly favour \(H_0\).
Larger fixed-sample sizes (e.g. from stricter
priors or smaller \(k\)) make
satisfying pceH0 more feasible but increase the number of
interim designs and thus the runtime.
Practical
recommendation for vignettes and examples
When using the design_twoarm_twostage_bf() function for
designing two-stage two-arm binomial phase II trials based on Bayes
factors, it is useful to:
- Choose moderately informative design priors rather
than completely flat ones.
- Avoid extremely stringent evidence thresholds and
target_ce_h0 targets.
- Use relatively modest
n2_max and, if needed, a coarser
grid_step (e.g. 2 or 3) to keep the number of interim
designs manageable.
This keeps runtime under control.
