Lagrange-like spectrum of perfect additive complements

Balázs Bárány; Jin-Hui Fang; Csaba Sándor

doi:10.4064/aa230224-10-10

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Lagrange-like spectrum of perfect additive complements

Volume 212 / 2024

Balázs Bárány, Jin-Hui Fang, Csaba Sándor Acta Arithmetica 212 (2024), 269-287 MSC: Primary 11B34; Secondary 11J06 DOI: 10.4064/aa230224-10-10 Published online: 16 February 2024

Abstract

Two infinite sets $A$ and $B$ of non-negative integers are called perfect additive complements of non-negative integers if every non-negative integer can be uniquely expressed as the sum of elements from $A$ and $B$. We define a Lagrange-like spectrum of the perfect additive complements ($\mathfrak L$ for short). As a main result, we obtain the smallest accumulation point of the set $\mathfrak L$ and prove that $\mathfrak L $ is closed.

Authors

Balázs BárányDepartment of Stochastics
Institute of Mathematics
Budapest University of Technology and Economics
H-1111 Budapest, Hungary
e-mail
Jin-Hui FangSchool of Mathematical Sciences
Nanjing Normal University
Nanjing 210023, P.R. China
e-mail
Csaba SándorDepartment of Stochastics
Institute of Mathematics
Budapest University of Technology and Economics
H-1111 Budapest, Hungary
and
Department of Computer Science and Information Theory
Budapest University of Technology and Economics
H-1111 Budapest, Hungary
and
MTA-BME Lendület Arithmetic Combinatorics Research Group, ELKH
H-1111 Budapest, Hungary
e-mail

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Publishing house / Journals and Serials / Acta Arithmetica / All issues

Acta Arithmetica

Lagrange-like spectrum of perfect additive complements

Volume 212 / 2024

Abstract

Authors

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