%0 Journal Article
%@ 0036-1410
%A  Gaál Marcell Gábor
%A  Nagy Béla
%A  Nagy-Csiha Zsuzsanna
%A  Révész Szilárd
%A MTA-SZTE Analízis és Sztochasztika Kutatócsoport SZTE / TTIK / MI [2016-],
%A Analízis RAMKI [1955-],
%A PhD Informatika Doktori Iskola ELTE / IK PhD_Inf_DI [2006-],
%A MTA-DE Lendület Funkcionálanalízis Kutatócsoport DE / TTK MTADELFK [2014-],
%A Matematikai és Informatikai Intézet PTE / TTK MII,
%D 2020
%F publicatio:21014
%J SIAM JOURNAL ON MATHEMATICAL ANALYSIS
%N 6
%P 6281-6296
%T Minimal Energy Point Systems on the Unit Circle and the Real Line
%U http://publicatio.bibl.u-szeged.hu/21014/
%V 52
%Z Export Date: 1 February 2021                         Funding details: 308015                         Funding details: Emberi Eroforrások Minisztériuma, EMMI, UNKP-18-4, UNKP-19-3                         Funding details: K-119528, K-132097                         Funding details: K-128972, K-115383                         Funding details: Ministry for Innovation and Technology, TUDFO/47138-1/2019-ITM                         Funding text 1: \\ast Received by the editors November 27, 2019; accepted for publication (in revised form) October 5, 2020; published electronically December 15, 2020. https://doi.org/10.1137/19M1302971 Funding: The work of the authors was partially supported by the DAAD-TKA Research Project ``Harmonic Analysis and Extremal Problems"" grant 308015. The work of the first author was supported by the National Research, Development, and Innovation Office NKFIH Register grants K-115383 and K-128972 and the Ministry for Innovation and Technology, Hungary, grant TUDFO/47138-1/2019-ITM. The work of the second author was supported by the New National Excellence Program of the Ministry of Human Capacities grant UNKP-18-4. The work of the third author was supported by the New National Excellence Program of the Ministry for Innovation and Technology grant UNKP-19-3. The work of the fourth author was partially supported by the Hungarian National Research, Development, and Innovation Fund projects K-119528 and K-132097. Funding Agency and Grant Number: DAAD-TKA Research Project "Harmonic Analysis and Extremal Problems" [308015]; National Research, Development, and Innovation Office NKFIH [K-115383, K-128972]; Ministry for Innovation and Technology, Hungary [TUDFO/47138-1/2019-ITM]; New National Excellence Program of the Ministry of Human Capacities [UNKP-18-4]; New National Excellence Program of the Ministry for Innovation and Technology [UNKP-19-3]; Hungarian National Research, Development, and Innovation Fund [K-119528, K-132097]             Funding text: The work of the authors was partially supported by the DAAD-TKA Research Project "Harmonic Analysis and Extremal Problems" grant 308015. The work of the first author was supported by the National Research, Development, and Innovation Office NKFIH Register grants K-115383 and K-128972 and the Ministry for Innovation and Technology, Hungary, grant TUDFO/47138-1/2019-ITM. The work of the second author was supported by the New National Excellence Program of the Ministry of Human Capacities grant UNKP-18-4. The work of the third author was supported by the New National Excellence Program of the Ministry for Innovation and Technology grant UNKP-19-3. The work of the fourth author was partially supported by the Hungarian National Research, Development, and Innovation Fund projects K-119528 and K-132097.