The Inverse Erdős-Heilbronn Problem

Abstract: The famous Erdős-Heilbronn conjecture (first proved by Dias da Silva and Hamidoune in 1994) asserts that if $A$ is a subset of ${\Bbb Z}/p{\Bbb Z}$, the cyclic group of the integers modulo a prime $p$, then $|A\widehat{+}A| \ge \min\{2|A| -3,p\}. $ The bound is sharp, as is shown by choosing $A$ to be an arithmetic progression. A natural inverse result was proven by Karolyi in 2005: if $A\subset {\Bbb Z}/p{\Bbb Z}$ contains at least 5 elements and $|A\widehat{+}A| \le 2|A| -3 < p$, then $A$ must be an ari… Show more

“…Among other tools, the isoperimetric approach, was used by Serra-Zemor [18] and by Vu-Wood [23] to replace the classical rectification. It was also used by the author [11] to propose a geometric approach to the classical Kemperman Theory [14], leading to simplifications and generalizations.…”

On Minkowski product size: The Vosper's property

“…Among other tools, the isoperimetric approach, was used by Serra-Zemor [18] and by Vu-Wood [23] to replace the classical rectification. It was also used by the author [11] to propose a geometric approach to the classical Kemperman Theory [14], leading to simplifications and generalizations.…”

On Minkowski product size: The Vosper's property

Inverse results for restricted sumsets in $${\mathbb {Z}/p\mathbb {Z}}$$

A Kneser-Type Theorem for Restricted Sumsets