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Extended inverse results for restricted h-fold sumset in integers

Debyani Manna, Mohan, Ram Krishna Pandey

Abstract

Let $A$ be a finite set of $k$ integers. For $h \leq k$, the restricted $h$-fold sumset $h^{\wedge} A$ is the set of all sums of $h$ distinct elements of $A$. In additive combinatorics, much of the focus has traditionally been on finite integer sets whose sumsets are unusually small (cf.\ Freiman's theorem and its extensions). More recently, Nathanson posed the inverse problem for the restricted sumset $h^{\wedge} A$ when $|h^{\wedge} A|$ is small. For $h \in \{2, 3, 4\}$, this question has already been studied by Mohan and Pandey. In this article, we study the inverse problems for $h^{\wedge} A$ with arbitrary $h \geq 3$ and characterize all possible sets $A$ for certain cardinalities of $h^{\wedge} A$.

Extended inverse results for restricted h-fold sumset in integers

Abstract

Let be a finite set of integers. For , the restricted -fold sumset is the set of all sums of distinct elements of . In additive combinatorics, much of the focus has traditionally been on finite integer sets whose sumsets are unusually small (cf.\ Freiman's theorem and its extensions). More recently, Nathanson posed the inverse problem for the restricted sumset when is small. For , this question has already been studied by Mohan and Pandey. In this article, we study the inverse problems for with arbitrary and characterize all possible sets for certain cardinalities of .
Paper Structure (2 sections, 35 theorems, 48 equations)

This paper contains 2 sections, 35 theorems, 48 equations.

Table of Contents

  1. Introduction
  2. Proofs

Key Result

Theorem 1.1

Nathanson1996 Let $h$ and $k$ be positive integers. Let $A$ be a nonempty finite set of $k$ integers. Then This lower bound is best possible. Furthermore, if $h \geq 2$ and $|hA|=h|A|-h+1,$ then $A$ is a $k$-term arithmetic progression.

Theorems & Definitions (52)

  • Theorem 1.1
  • Theorem 1.2
  • Theorem 1.3
  • Conjecture 1.4
  • Theorem 1.5
  • Theorem 1.6
  • Theorem 1.7
  • Conjecture 1.8
  • Theorem 1.9
  • Theorem 1.10
  • ...and 42 more