A connected component of the moduli space of surfaces with \(p_g=0\).
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Publication:5954109
DOI10.1016/S0040-9383(00)00004-5zbMath1072.14522MaRDI QIDQ5954109
Rita Pardini, Margarida Mendes Lopes
Publication date: 2001
Published in: Topology (Search for Journal in Brave)
Related Items (14)
A characterization of Burniat surfaces with \(K^2=4\) and of non nodal type ⋮ The classification of surfaces of general type with nonbirational bicanonical map ⋮ Derived categories of Burniat surfaces and exceptional collections ⋮ Geography of minimal surfaces of general type with Z22$\mathbb {Z}_2^2$‐actions and the locus of Gorenstein stable surfaces ⋮ Characterization of a class of surfaces with \(p_{g} = 0\) and \(K^{2} = 5\) by their bicanonical maps ⋮ Burniat surfaces. II: Secondary Burniat surfaces form three connected components of the moduli space ⋮ A new family of surfaces with and ⋮ Surfaces of general type with geometric genus zero: a survey ⋮ Bicanonical map of surfaces with χ = 1 fibered by hyperelliptic curves of genus 3 ⋮ Kulikov surfaces form a connected component of the moduli space ⋮ Surfaces with \(p_{g } = q = 1, K^{2} = 8\) and nonbirational bicanonical map ⋮ Numerical Godeaux surfaces with an involution ⋮ Log canonical thresholds on Burniat surfaces with \(K^2 = 6\) via pluricanonical divisors ⋮ The classification of double planes of general type with \(K^{2}=8\) and \(p_{g}=0\).
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