Andrei Zelevinsky
Published 2006-06-30Version 1
We study the cluster variables and "imaginary" elements of the semicanonical basis for the coefficient-free cluster algebra of affine type $A_1^{(1)}$. A closed formula for the Laurent expansions of these elements was obtained by P.Caldero and the author in math.RT/0604054. As a by-product, there was given a combinatorial interpretation of the Laurent polynomials in question, equivalent to the one obtained by G.Musiker and J.Propp in math.CO/0602408. The arguments in math.RT/0604054 used a geometric interpretation of the Laurent polynomials due to P.Caldero and F.Chapoton (math.RT/0410184). This note provides a quick, self-contained and completely elementary alternative proof of the same results.
Comments: 4 pages, no figures
Algebras Generated by Elements with Given Spectrum and Scalar Sum and Kleinian Singularities
Berkowitz's Algorithm and Clow Sequences
Finite Modules over $\Bbb Z[t,t^{-1}]$
![QR code for arXiv:math/0606775 [math.RA]](http://oss.arxitics.com/images/favicon.svg)