Two geometric models for graded skew-gentle algebras
Abstract
In Part 1, we classify (indecomposable) objects in the perfect derived category per of a graded skew-gentle algebra , generalizing technique/results of Burban-Drozd and Deng to the graded setting. We also use the usual punctured marked surface Sλ with grading (and a full formal arc system) to give a geometric model for this classification. In Part2, we introduce a new surface Sλ* with binaries from Sλ by replacing each puncture P by a boundary component *P (called a binary) with one marked point, and composing an equivalent relation D*P2=id, where D*p is the Dehn twist along *P. Certain indecomposable objects in per can be also classified by graded unknotted arcs on Sλ*. Moreover, using this new geometric model, we show that the intersections between any two unknotted arcs provide a basis of the morphisms between the corresponding arc objects, i.e. formula Int=dimHom holds.
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