Intersection vectors over skew-tilings
Abstract
We prove that under a mild condition, a multiset of tagged permissible arcs over a skew-tiling is uniquely determined by its intersection vector. As an application, it is proved that -- up to isomorphism -- different τ-rigid modules over a skew-gentle algebra A arising from a skew-triple (Q,Sp,I) have different dimension vectors if and only if (Q,I) has no minimal oriented cycle of even-length with full zero relations. This generalizes a recent work of Fu-Geng for gentle algebras.
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