Roth's theorem on arithmetic progressions

Roth's theorem on arithmetic progressions is a result in additive combinatorics concerning the existence of arithmetic progressions in subsets of the natural numbers. It was first proven by Klaus Roth in 1953. Roth's theorem is a special case of Szemerédi's theorem for the case .

For Roth's theorem on Diophantine approximation of algebraic numbers, see Roth's theorem.
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