When programming in Java (or any other procedural language for that matter), I often choose between solving something recursively vs solving it iteratively. The recursive option is often more elegant than an iterative solution so I usually go for the recursive solution. With one exception:
Worrying about stack overflows I tend to avoid recursive solutions if the maximum stack depth is linearly proportional to the size of the input (or worse). I realize however that in many other languages (even ones targeting the JVM such as Scala and Clojure) many algorithms, such as basic list algorithms for instance, are often expressed recursively where the maximum stack depths is proportional to the length of the list.(1) So, are my worries about stack overflows in linear-stack-depth-algorithms justified?
TL;DR: What "stack depth complexity" is considered reasonable? Logarithmic complexity, recursive binary search for instance, O(log N) is surely ok, but how about O(N), O(N log N), O(N2)? Where would you typically draw the line?(2)
(1) I realize that such languages sometimes supports things like @tailrec, but this question concerns Java, C# etc.
(2) Note that I'm not concerned about CPU overhead etc. Just the stack depth.