posted on 2019-05-17, 09:34authored byDylan Rupel, Salvatore Stella, Harold Williams
The cluster algebra of any acyclic quiver can be realized as the coordinate ring of a subvariety of a Kac-Moody group -- the quiver is an orientation of its Dynkin diagram, defining a Coxeter element and thereby a double Bruhat cell. We use this realization to connect representations of the quiver with those of the group. We show that cluster variables of preprojective (resp. postinjective) quiver representations are realized by generalized minors of highest-weight (resp. lowest-weight) group representations, generalizing results of Yang-Zelevinsky in finite type. In type $A_n^{\!(1)}$ and finitely many other affine types, we show that cluster variables of regular quiver representations are realized by generalized minors of group representations that are neither highest- nor lowest-weight; we conjecture this holds more generally.
Funding
This work was supported by an American Mathematical Society-Simons Travel Grant [to D.R.]; a Marie Curie - Istituto Nazionale di Alta Matematica Cofund Fellowship [to S.S.]; Israel Science Foundation grant [1144/16 to S.S.]; an National Science Foundation Postdoctoral Research Fellowship [DMS-1502845 to H.W.]; and National Science Foundation grant [DMS-1702489 to H.W.].
History
Citation
International Mathematics Research Notices, 2018, rny053
Author affiliation
/Organisation/COLLEGE OF SCIENCE AND ENGINEERING/Department of Mathematics