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Freiman's_theorem abstract "In mathematics, Freiman's theorem is a combinatorial result in number theory. In a sense it accounts for the approximate structure of sets of integers that contain a high proportion of their internal sums, taken two at a time. The formal statement is:Let A be a finite set of integers such that the sumset is small, in the sense that for some constant . There exists an n-dimensional arithmetic progression of length that contains A, and such that c' and n depend only on c.A simple instructive case is the following. We always have ≥ with equality precisely when A is an arithmetic progression. This result is due to Gregory Freiman (1964,1966). Much interest in it, and applications, stemmed from a new proof by Imre Z. Ruzsa (1994).".
Freiman's_theorem wikiPageID "2240299".
Freiman's_theorem wikiPageRevisionID "571625309".
Freiman's_theorem hasPhotoCollection Freiman's_theorem.
Freiman's_theorem id "4304".
Freiman's_theorem title "Freiman's theorem".
Freiman's_theorem subject Category:Sumsets.
Freiman's_theorem subject Category:Theorems_in_number_theory.
Freiman's_theorem type Abstraction100002137.
Freiman's_theorem type Communication100033020.
Freiman's_theorem type Message106598915.
Freiman's_theorem type Proposition106750804.
Freiman's_theorem type Statement106722453.
Freiman's_theorem type Theorem106752293.
Freiman's_theorem type TheoremsInNumberTheory.
Freiman's_theorem comment "In mathematics, Freiman's theorem is a combinatorial result in number theory. In a sense it accounts for the approximate structure of sets of integers that contain a high proportion of their internal sums, taken two at a time. The formal statement is:Let A be a finite set of integers such that the sumset is small, in the sense that for some constant .".
Freiman's_theorem label "Freiman's theorem".
Freiman's_theorem label "Teorema de Freiman".
Freiman's_theorem label "Théorème de Freiman".
Freiman's_theorem sameAs Θεώρημα_του_Φράιμαν.
Freiman's_theorem sameAs Théorème_de_Freiman.
Freiman's_theorem sameAs Teorema_de_Freiman.
Freiman's_theorem sameAs m.06ygtx.
Freiman's_theorem sameAs Q3527079.
Freiman's_theorem sameAs Q3527079.
Freiman's_theorem sameAs Freiman's_theorem.
Freiman's_theorem wasDerivedFrom Freiman's_theorem?oldid=571625309.
Freiman's_theorem isPrimaryTopicOf Freiman's_theorem.