A construction of the generalized higher cluster category arising from an (m+2)-angulation of a marked surface
Abstract
In this article, we study the (m+2)-angulations on a Riemann surface, characterized with its boundary components, punctures, and gender. We count the number of arcs in such a surface, and associate a graded quiver with superpotential associated with an (m2)-angulation. We show the compatibility between the flip of an (m+2)-angulation and the flip in the unpunctured case.
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