sepmodel_adj_cont: Separate analysis for continuous data adjusted for periods

List containing the following elements regarding the results of comparing arm to control:

• p-val - p-value (one-sided)

• treat_effect - estimated treatment effect in terms of the difference in means

• lower_ci - lower limit of the (1-2*alpha)*100% confidence interval

• upper_ci - upper limit of the (1-2*alpha)*100% confidence interval

• reject_h0 - indicator of whether the null hypothesis was rejected or not (p_val < alpha)

• model - fitted model

The adjusted separate analysis takes into account only the data from the evaluated experimental treatment arm and its concurrent controls and adjusts for the time effect by including the factor period (defined as a time interval bounded by any treatment arm entering or leaving the platform). The time is then modelled as a step-function with jumps at the beginning of each period. Denoting by \(y_j\) the response probability for patient \(j\), by \(k_j\) the arm patient \(j\) was allocated to, and by \(M\) the treatment arm under evaluation, the regression model is given by:

$$E(y_j) = \eta_0 + \theta_M \cdot I(k_j=M) + \sum_{s=S_{M_1}+1}^{S_{M_2}} \tau_s \cdot I(t_j \in T_{S_s})$$

where \(\eta_0\) is the response in the concurrent controls; \(\theta_M\) represents the treatment effect of treatment \(M\) as compared to control; \(\tau_s\) indicates the stepwise period effect between periods \(S_{M_1}\) and \(s\) (\(s = S_{M_1}+1, \ldots, S_{M_2}\)), where \(S_{M_1}\) and \(S_{M_2}\) denote the periods, in which the investigated treatment arm joined and left the trial, respectively.

If the data consists of only one period, the period in not used as covariate.