"Please do my literature search for me" is not a reasonable request, though.
Knowing the term of art is very helpful for doing these sorts of searches, though. If one goes to the wikipedia page on summary statistics, one can easily get to the page for descriptive statistics, but neither of them are very good at leading one on to robust statistics, or anything besides the mean or median.
Google for "summary statistics" is sufficient. But more importantly, lit. search isn't a google/wikipedia type of activity.
In a previous post, I looked at some of the properties of using the median rather than the mean.
Inspired by Househalter's comment, it seems we might be able to take a compromise between median and mean. It seems to me that simply taking the mean of the lower quartile, median, and upper quartile would also have the nice features I described, and would likely be closer to the mean.
Furthermore, there's no reason to stop there. We can take the mean of the n-1 n-quantiles.
Two questions:
Note the unlike the median approach, for large enough n, this maximiser will pay Pascal's mugger.