Abstract
Abstract
We consider a quiver with potential (QP)
$(Q(D),W(D))$
and an iced quiver with potential (IQP)
$(\overline {Q}(D), F(D), \overline {W}(D))$
associated with a Postnikov Diagram D and prove that their mutations are compatible with the geometric exchanges of D. This ensures that we may define a QP
$(Q,W)$
and an IQP
$(\overline {Q},F,\overline {W})$
for a Grassmannian cluster algebra up to mutation equivalence. It shows that
$(Q,W)$
is always rigid (thus nondegenerate) and Jacobi-finite. Moreover, in fact, we show that it is the unique nondegenerate (thus rigid) QP by using a general result of Geiß, Labardini-Fragoso, and Schröer (2016, Advances in Mathematics 290, 364–452).
Then we show that, within the mutation class of the QP for a Grassmannian cluster algebra, the quivers determine the potentials up to right equivalence. As an application, we verify that the auto-equivalence group of the generalized cluster category
${\mathcal {C}}_{(Q, W)}$
is isomorphic to the cluster automorphism group of the associated Grassmannian cluster algebra
${{\mathcal {A}}_Q}$
with trivial coefficients.
Publisher
Canadian Mathematical Society