Some say that optimal estimators should be preferred while others advocate the use of more robust estimators. What is your opinion?

When you formulate your answer to this question it may be useful to come up with an example from your own field of interest. Think of an estimation problem and possible estimators that can be used in the context of this problem. Try to identify a model that is natural to this problem and ask yourself in what ways may this model err in its attempt to describe the real situation in the estimation problem.

As an example, consider estimation of the expectation of a Uniform measurement. We demonstrated that the mid-range estimator is better than the sample average if indeed the measurements emerge from the Uniform distribution. However, if the modeling assumption is wrong then this may no longer be the case. If the distribution of the measurement, in actuality, is not symmetric or if the distribution is more concentrated in the center than in the tails then the performance of the mid-range estimator may deteriorate. The sample average, on the other hand is not sensitive to the distribution not being symmetric.