Additive properties of sequences of pseudo s-th powers

Javier Cilleruelo; Jean Marc Deshouillers; Victor Lambert; Alain Plagne

doi:10.1007/s00209-016-1651-8

Additive properties of sequences of pseudo s-th powers

Javier Cilleruelo
, Jean Marc Deshouillers
, Victor Lambert
, Alain Plagne

Universidad Autónoma de Madrid
IMB UMR 5251
Université Paris-Saclay

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we study (random) sequences of pseudo s-th powers, as introduced by Erdős and Rényi (Acta Arith 6:83–110, 1960). Goguel (J Reine Angew Math 278/279:63–77, 1975) proved that such a sequence is almost surely not an asymptotic basis of order s. Our first result asserts that it is however almost surely a basis of order s+ ϵ for any ϵ> 0. We then study the s-fold sumset sA= A+ ⋯ + A (s times) and in particular the minimal size of an additive complement, that is a set B such that sA+ B contains all large enough integers. With respect to this problem, we prove quite precise theorems which are tantamount to asserting that a threshold phenomenon occurs.

Original language	English
Pages (from-to)	175-193
Number of pages	19
Journal	Mathematische Zeitschrift
Volume	284
Issue number	1-2
DOIs	https://doi.org/10.1007/s00209-016-1651-8
Publication status	Published - 1 Oct 2016
Externally published	Yes

Keywords

Additive basis
Additive number theory
Probabilistic method
Pseudo s-powers

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10.1007/s00209-016-1651-8

Cite this

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title = "Additive properties of sequences of pseudo s-th powers",

abstract = "In this paper, we study (random) sequences of pseudo s-th powers, as introduced by Erd{\H o}s and R{\'e}nyi (Acta Arith 6:83–110, 1960). Goguel (J Reine Angew Math 278/279:63–77, 1975) proved that such a sequence is almost surely not an asymptotic basis of order s. Our first result asserts that it is however almost surely a basis of order s+ ϵ for any ϵ> 0. We then study the s-fold sumset sA= A+ ⋯ + A (s times) and in particular the minimal size of an additive complement, that is a set B such that sA+ B contains all large enough integers. With respect to this problem, we prove quite precise theorems which are tantamount to asserting that a threshold phenomenon occurs.",

keywords = "Additive basis, Additive number theory, Probabilistic method, Pseudo s-powers",

author = "Javier Cilleruelo and Deshouillers, \{Jean Marc\} and Victor Lambert and Alain Plagne",

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doi = "10.1007/s00209-016-1651-8",

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T1 - Additive properties of sequences of pseudo s-th powers

AU - Cilleruelo, Javier

AU - Deshouillers, Jean Marc

AU - Lambert, Victor

AU - Plagne, Alain

PY - 2016/10/1

Y1 - 2016/10/1

N2 - In this paper, we study (random) sequences of pseudo s-th powers, as introduced by Erdős and Rényi (Acta Arith 6:83–110, 1960). Goguel (J Reine Angew Math 278/279:63–77, 1975) proved that such a sequence is almost surely not an asymptotic basis of order s. Our first result asserts that it is however almost surely a basis of order s+ ϵ for any ϵ> 0. We then study the s-fold sumset sA= A+ ⋯ + A (s times) and in particular the minimal size of an additive complement, that is a set B such that sA+ B contains all large enough integers. With respect to this problem, we prove quite precise theorems which are tantamount to asserting that a threshold phenomenon occurs.

AB - In this paper, we study (random) sequences of pseudo s-th powers, as introduced by Erdős and Rényi (Acta Arith 6:83–110, 1960). Goguel (J Reine Angew Math 278/279:63–77, 1975) proved that such a sequence is almost surely not an asymptotic basis of order s. Our first result asserts that it is however almost surely a basis of order s+ ϵ for any ϵ> 0. We then study the s-fold sumset sA= A+ ⋯ + A (s times) and in particular the minimal size of an additive complement, that is a set B such that sA+ B contains all large enough integers. With respect to this problem, we prove quite precise theorems which are tantamount to asserting that a threshold phenomenon occurs.

KW - Additive basis

KW - Additive number theory

KW - Probabilistic method

KW - Pseudo s-powers

U2 - 10.1007/s00209-016-1651-8

DO - 10.1007/s00209-016-1651-8

M3 - Article

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SN - 0025-5874

VL - 284

SP - 175

EP - 193

JO - Mathematische Zeitschrift

JF - Mathematische Zeitschrift

IS - 1-2

ER -

Additive properties of sequences of pseudo s-th powers

Abstract

Keywords

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