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- Vaughan's_identity abstract "In mathematics, Vaughan's identity is an identity found by R. C. Vaughan (1977) that can be used to simplify Vinogradov's work on trigonometric sums. It can be used to estimate sums of the formwhere f is some function of positive integers n, whose values in applications are often roots of unity, and Λ is the von Mangoldt function.Vaughan's identity has been used to simplify the proof of the Bombieri–Vinogradov theorem and to study Kummer sums.Vaughan's identity was generalized by Heath-Brown (1982).".
- Vaughan's_identity wikiPageID "14996853".
- Vaughan's_identity wikiPageRevisionID "534663544".
- Vaughan's_identity authorlink "Robert Charles Vaughan".
- Vaughan's_identity first "R. C.".
- Vaughan's_identity first "S.W.".
- Vaughan's_identity hasPhotoCollection Vaughan's_identity.
- Vaughan's_identity id "V/v130030".
- Vaughan's_identity last "Graham".
- Vaughan's_identity last "Vaughan".
- Vaughan's_identity txt "yes".
- Vaughan's_identity year "1977".
- Vaughan's_identity subject Category:Analytic_number_theory.
- Vaughan's_identity comment "In mathematics, Vaughan's identity is an identity found by R. C. Vaughan (1977) that can be used to simplify Vinogradov's work on trigonometric sums.".
- Vaughan's_identity label "Identidade de Vaughan".
- Vaughan's_identity label "Vaughan's identity".
- Vaughan's_identity sameAs Identidade_de_Vaughan.
- Vaughan's_identity sameAs m.03h45c6.
- Vaughan's_identity sameAs Q7917272.
- Vaughan's_identity sameAs Q7917272.
- Vaughan's_identity wasDerivedFrom Vaughan's_identity?oldid=534663544.
- Vaughan's_identity isPrimaryTopicOf Vaughan's_identity.