Surfaces with \(p_g=q=1\), \(K^2=6\) and non-birational bicanonical maps
From MaRDI portal
Publication:1734929
DOI10.1007/s10114-018-7262-zzbMath1409.14070OpenAlexW2805398216MaRDI QIDQ1734929
Publication date: 27 March 2019
Published in: Acta Mathematica Sinica. English Series (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10114-018-7262-z
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Involutions on surfaces with \(p_g = q = 1\)
- Standard isotrivial fibrations with \(p_g=q=1\)
- Some (big) irreducible components of the moduli space of minimal surfaces of general type with \(p_{g} = q = 1\) and \(K^{2} = 4\)
- Surfaces with \(p_{g } = q = 1, K^{2} = 8\) and nonbirational bicanonical map
- The maximal number of quotient singularities on surfaces with given numerical invariants
- Surfaces fibrées en courbes de genre deux
- Weil divisors on normal surfaces
- Vector bundles of rank 2 and linear systems on algebraic surfaces
- Moduli and classification of irregular Kaehler manifolds (and algebraic varieties) with Albanese general type fibrations. Appendix by Arnaud Beauville
- On Kähler fiber spaces over curves
- Surfaces with \(p_g=q=1\), \(K^2=7\) and non-birational bicanonical maps
- On surfaces of general type with \(p_g=q=1\), \(K^2=3\)
- Standard isotrivial fibrations with \(p_g = q = 1\). II.
- Degree of the Bicanonical Map of a Surface of General Type
- Vector Bundles Over an Elliptic Curve
- On rational surfaces I. Irreducible curves of arithmetic genus $0$ or $1$
- Inégalités numériques pour les surfaces de type général. Appendice : «L'inégalité $p_g \ge 2q-4$ pour les surfaces de type général» par A. Beauville
- On Surfaces of General Type withpg = q = 1 Isogenous to a Product of Curves
- On equations of double planes with $p_g=q=1$
- Some bidouble planes with pg= q = 0 and 4 ≤ K2≤ 7
- The classification of surfaces of general type with nonbirational bicanonical map
- Surfaces of general type with 𝑝_{𝑔}=𝑞=1,𝐾²=8 and bicanonical map of degree 2
This page was built for publication: Surfaces with \(p_g=q=1\), \(K^2=6\) and non-birational bicanonical maps
