Effective H∞ interpolation constrained by Hardy and Bergman weighted norms

Abstract

Given a finite set σ of the unit disc D and a holomorphic function f in D which belongs to a class X we are looking for a function g in another class Y which minimizes the norm |g|Y among all functions g such that g|σ=f|σ. Generally speaking, the interpolation constant considered is c(σ,\, X,\, Y)=supf∈ X,\, fX≤1inf\|g|Y:\, g|σ=f|σ\ \,. When Y=H∞, our interpolation problem includes those of Nevanlinna-Pick (1916), Caratheodory-Schur (1908). Moreover, Carleson's free interpolation (1958) has also an interpretation in terms of our constant c(σ,\, X,\, H∞). If X is a Hilbert space belonging to the scale of Hardy and Bergman weighted spaces, we show that c(σ,\, X,\, H∞)≤ aφX(1-1-rn) where n=#σ, r=maxλ∈σ|λ| and where φX(t) stands for the norm of the evaluation functional f f(t) on the space X. The upper bound is sharp over sets σ with given n and r. If X is a general Hardy-Sobolev space or a general weighted Bergman space (not necessarily of Hilbert type), we also found upper and lower bounds for c(σ,\, X,\, H∞) (sometimes for special sets σ) but with some gaps between these bounds. This constrained interpolation is motivated by some applications in matrix analysis and in operator theory.