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Greens formula with $bbc^{*}$-action and Caldero-Kellers formula for cluster algebras

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 Added by Jie Xiao
 Publication date 2008
  fields
and research's language is English




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It is known that Greens formula over finite fields gives rise to the comultiplications of Ringel-Hall algebras and quantum groups (seecite{Green}, also see cite{Lusztig}). In this paper, we deduce the projective version of Greens formula in a geometric way. Then following the method of Hubery in cite{Hubery2005}, we apply this formula to proving Caldero-Kellers multiplication formula for acyclic cluster algebras of arbitrary type.



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The objective of the present paper is to give a survey of recent progress on applications of the approaches of Ringel-Hall type algebras to quantum groups and cluster algebras via various forms of Greens formula. In this paper, three forms of Greens formula are highlighted, (1) the original form of Greens formula cite{Green}cite{RingelGreen}, (2) the degeneration form of Greens formula cite{DXX} and (3) the projective form of Greens formula cite{XX2007a} i.e. Green formula with a $bbc^{*}$-action.
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