On surfaces with \(p_{g} = q = 2, K^{2} = 5\) and Albanese map of degree 3
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Publication:379111
zbMath1288.14026arXiv1011.4388MaRDI QIDQ379111
Matteo Penegini, Francesco Polizzi
Publication date: 8 November 2013
Published in: Osaka Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1011.4388
Vector bundles on surfaces and higher-dimensional varieties, and their moduli (14J60) Families, moduli, classification: algebraic theory (14J10) Surfaces of general type (14J29)
Related Items (9)
TRIPLE COVERS OF K3 SURFACES ⋮ A note on a family of surfaces with \(p_g=q=2\) and \(K^2=7\) ⋮ On surfaces with \(p_{g} = q = 2, K^{2} = 5\) and Albanese map of degree 3 ⋮ Topological methods in moduli theory ⋮ Special triple covers of algebraic surfaces ⋮ Quotients of the square of a curve by a mixed action, further quotients and Albanese morphisms ⋮ A note on surfaces with \(p_{g} = q = 2\) and an irrational fibration ⋮ Monodromy representations and surfaces with maximal Albanese dimension ⋮ On the cohomology of surfaces with $p_g = q = 2$ and maximal Albanese dimension
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