Extremal functions in de Branges and Euclidean spaces

Abstract

In this work we obtain optimal majorants and minorants of exponential type for a wide class of radial functions on RN. These extremal functions minimize the L1(RN, |x|2 + 2 - Ndx)-distance to the original function, where >-1 is a free parameter. To achieve this result we develop new interpolation tools to solve an associated extremal problem for the exponential function Fλ(x) = e-λ|x|, where λ >0, in the general framework of de Branges spaces of entire functions. We then specialize the construction to a particular family of homogeneous de Branges spaces to approach the multidimensional Euclidean case. Finally, we extend the result from the exponential function to a class of subordinated radial functions via integration on the parameter λ >0 against suitable measures. Applications of the results presented here include multidimensional versions of Hilbert-type inequalities, extremal one-sided approximations by trigonometric polynomials for a class of even periodic functions and extremal one-sided approximations by polynomials for a class of functions on the sphere SN-1 with an axis of symmetry.