Following the publication of the original paper [1], the authors identified two errors in the notation and formulas in the Methods section.

figure a

Equation (1) in the online version.

The first error is the \(U_{ij}\) expression. Specifically, Eq. (1) should be corrected as

$$\begin{aligned} U_{ij}=(1-V_{ij})F_i(X_{ij}-1)+V_{ij}F_i(X_{ij})\,. \end{aligned}$$
(1)
figure b

The end of the derivation of Eq. (1) in the online version.

Accordingly, at the end of the derivation of

$$\begin{aligned} U_{ij}= & {} \tilde{F}_i(X_{ij} + V_{ij}) = F_i(X_{ij} - 1) + V_{ij}\left( F_i(X_{ij}) - F_i(X_{ij}-1)\right) \\= & {} V_{ij}F_i(X_{ij}-1)+(1-V_{ij})F_i(X_{ij})\, , \end{aligned}$$

The last line should be changed to

$$\begin{aligned} U_{ij}= & {} \cdots \\= & {} (1-V_{ij})F_i(X_{ij}-1)+V_{ij}F_i(X_{ij})\,, \end{aligned}$$

The second error is one notation in the sentence just before the above-corrected expression. In “Hence, \(\tilde{X}_{ij} \sim \tilde{F}_i\); that is, the continuous random variable \(\tilde{X}_{ij}\) constructed from \(X_{ij}\) and \(V_{ij}\) follows \(\tilde{F}_{ij}\)”, at the end, \(\tilde{F}_{ij}\) should be corrected as \(\tilde{F}_{i}\).

The authors confirm that the notational errors corrected here had no effect on the conclusions or the performance of the method scDesign2.