The Steklov problem and Remainder Estimates for Krein Systems generated by a Muckenhoupt weight

Abstract

We show that solutions to Krein systems, the continuous frequency analogue of orthogonal polynomials on the unit circle, generated by an A2 (R) weight w satisfying w-1 ∈ L1 (R) + L2 (R), are uniformly bounded in Lploc (w, R) for p sufficiently close to 2. This provides a positive answer to the Steklov problem for Krein systems. Furthermore, we define a "remainder" which measures the difference between the solution to a Krein system and a polynomial-like approximant, and we estimate these remainders in Lpw (R) for w ∈ A2 (R) satisfying some additional conditions. Such polynomial-like approximants, and hence remainder estimates, seem unique to Krein systems, with no analogue for orthogonal polynomials on the unit circle.