Bangle functions are the generic basis for cluster algebras from punctured surfaces with boundary
Abstract
We prove that for any possibly-punctured surface with non-empty boundary =(, M, P), and any tagged triangulation T of in the sense of Fomin--Shapiro--Thurston, the coefficient-free bangle functions of Musiker--Schiffler--Williams coincide with the coefficient-free generic Caldero--Chapoton functions arising from the Jacobian algebra of the quiver with potential (Q(T), W(T)) associated to T by Cerulli Irelli and the second author. When the set of boundary marked points M has at least two elements, Schr\"oer and the first two authors have shown, relying heavily on results of Mills, Muller and Qin, that the generic coefficient-free Caldero-Chapoton functions form a basis of the coefficient-free (upper) cluster algebra A()=U(). So, the set of bangle functions proposed by Musiker--Schiffler--Williams over ten years ago is indeed a basis.
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