On pointwise estimates of positive definite functions with given support

Abstract

The following problem originated from a question due to Paul Turan. Suppose is a convex body in Euclidean space d or in d, which is symmetric about the origin. Over all positive definite functions supported in , and with normalized value 1 at the origin, what is the largest possible value of their integral? From this Arestov, Berdysheva and Berens arrived to pose the analogous pointwise extremal problem for intervals in . That is, under the same conditions and normalizations, and for any particular point z∈, the supremum of possible function values at z is to be found. However, it turns out that the problem for the real line has already been solved by Boas and Kac, who gave several proofs and also mentioned possible extensions to d and non-convex domains as well. We present another approach to the problem, giving the solution in d and for several cases in d. In fact, we elaborate on the fact that the problem is essentially one-dimensional, and investigate non-convex open domains as well. We show that the extremal problems are equivalent to more familiar ones over trigonometric polynomials, and thus find the extremal values for a few cases. An analysis of the relation of the problem for the space d to that for the torus d is given, showing that the former case is just the limiting case of the latter. Thus the hiearachy of difficulty is established, so that trigonometric polynomial extremal problems gain recognition again.

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