Moduli spaces of witch curves topologically realize the 2-associahedra
Abstract
For r ≥ 1 and n ∈ Z≥0r\0\, we construct the compactified moduli space 2Mn of witch curves of type n. We equip 2Mn with a stratification by the 2-associahedron Wn, and prove that 2Mn is compact and metrizable. In addition, we show that the forgetful map 2Mn Mr to the moduli space of stable disk trees is continuous and respects the stratifications.
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