Remarks on results by M\"uger and Tuset on the moments of polynomials

Abstract

Let f(x) be a non-zero polynomial with complex coefficients, and Mp = ∫01 f(x)p dx for p a positive integer. In a recent paper, M\"uger and Tuset showed that p ∞ |Mp|1/p > 0, and conjectured that this limit is equal to the maximum amongst the critical values of f together with the values |f(0)| and |f(1)|. We give an example that shows that this conjecture is false. It also may be natural to guess that p ∞ |Mp|1/p is equal to the maximum of |f(x)| on [0,1]. However, we give a counterexample to this as well. We also provide a few more guesses as to the behaviour of the quantity p ∞ |Mp|1/p.