Unbounded Widom factors for orthogonal and residual polynomials

Abstract

We study Widom factors for (a) monic orthogonal polynomials in L2 with respect to the equilibrium measure of a compact set K⊂R and (b) residual polynomials normalized at an exterior point. Using weakly equilibrium Cantor sets K(γ), we prove: (1) Given any sequence (cn) with subexponential growth, there exists a non-polar Cantor set K(γ), depending on (cn), such that the L2 Widom factors of the associated orthogonal polynomials (with respect to the equilibrium measure of K(γ)) exceed cn for every n. (2) For the same K(γ) built from (cn) and each exterior point x0∈R K(γ), the residual Widom factors satisfy power-type lower bounds with a Harnack-distance exponent τx0∈(0,1): they are bounded below by cnτx0 for all degrees when x0 lies in an unbounded gap, and along a subsequence of degrees when x0 lies in a bounded gap. Consequently, if, in addition, (cn) is monotone increasing and unbounded, then the sequence of residual Widom factors is unbounded for every x0∈R K(γ). The proofs combine inverse-image constructions, capacity comparisons for period-n sets, harmonic-measure representations for differences of Green functions, and alternation principles on nested approximants.