diff options
Diffstat (limited to 'siopt-2021-140246-r1.tex')
| -rw-r--r-- | siopt-2021-140246-r1.tex | 31 |
1 files changed, 31 insertions, 0 deletions
diff --git a/siopt-2021-140246-r1.tex b/siopt-2021-140246-r1.tex new file mode 100644 index 0000000..51476ad --- /dev/null +++ b/siopt-2021-140246-r1.tex @@ -0,0 +1,31 @@ +\documentclass[10pt]{article} +\usepackage[T1]{fontenc} +\usepackage[utf8]{inputenc} +\usepackage[hmargin=1in, vmargin=1in]{geometry} +\usepackage{amsmath,amsfonts} + +\title{\large Review of \emph{The stochastic Auxiliary Problem Principle in Banach Spaces}\\ +First Revision} +\date{} + +\begin{document} + +\maketitle + +I would like to thank the authors for their careful revision. I believe that my comments and suggestions have been adequately addressed. However, I have a few additional (minor) concerns about some of the new content (in blue) that was added due to Reviewer 2's concerns: +\begin{itemize} + \item page 22 line 887: I don't see why equation (4.13) implies that the sequence $\{\mathbb{E}(J(U_k) - J(u^\sharp))\}$ is bounded. Could it be that the authors simply meant “finite” instead of “bounded”? It seems that finiteness would suffice where boundedness is used (line 940 on page 23). I think the author should either write “finite” below (4.13) if it is indeed sufficient, or explain why boundedness holds and why it is required in line 940 on page 23. + + \item page 24 equation (4.15): I believe $\beta_{k-1}$ should be $\beta_k$ + + \item page 24 equation (4.17): similarly, $\beta_{k-1}$ should be $\beta_k$ + + \item page 24 line 967: it is not obvious that the existence of the constant $M'$ is guaranteed by Corollary 4.3. Indeed, one could apply Corollary A.3 to equation (4.16) for fixed $n$ and $i$ to obtain the following proposition: \emph{for all $j\in \mathbb{N}$ there exists $M_j$ such that for all $k\geq j$, $\mathbb{E}(\ell_{U_j}(U_k))\leq M_j$}. But the constant $M_j$ could depend on $j$ \emph{a priori} and it seems that an additional argument is required to justify that the sequence $\{M_j\}$ is bounded by a universal constant $M'$ as claimed by the authors. +\end{itemize} + +Overall, my positive impression of the paper remains and I recommend publication in SIOPT once the above points are clarified. + +%\bibliographystyle{plain} +%\bibliography{main} + +\end{document} |