The Point Value Maximization Problem for Positive Definite Functions Supported in a Given Subset of a Locally Compact Group

Abstract: The century old extremal problem, solved by Carathéodory and Fejér, concerns a nonnegative trigonometric polynomial T ptq " a 0`ř n k"1 a k cosp2πktq`b k sinp2πktq ě 0, normalized by a 0 " 1, and the quantity to be maximized is the coefficient a 1 of cosp2πtq. Carathéodory and Fejér found that for any given degree n the maximum is 2 cosp π n`2 q. In the complex exponential form, the coefficient sequence pc k q Ă C will be supported in r´n, ns and normalized by c 0 " 1. Reformulating, nonnegativity of T transla… Show more

“…The statement can be found e.g. in[35, (32.8) (d)] and[35, (32.9) Theorem], see also[48, Lemma 12(v)],[47, Lemma 2.6.1 (iii)].…”

Delsarte’s extremal problem and packing on locally compact Abelian groups

“…The statement can be found e.g. in[35, (32.8) (d)] and[35, (32.9) Theorem], see also[48, Lemma 12(v)],[47, Lemma 2.6.1 (iii)].…”

Delsarte’s extremal problem and packing on locally compact Abelian groups

“…The statement can be found e.g. in[27, (32.8) (d)] and[27, (32.9) Theorem], see also[36, Lemma 12(v)],[35, Lemma 2.6.1 (iii)].…”

Delsarte's Extremal Problem and Packing on Locally Compact Abelian Groups