Surfaces with \(K^{2}=8, p_{g}=4\) and canonical involution
From MaRDI portal
Publication:1043691
zbMath1181.14040arXivmath/0603094MaRDI QIDQ1043691
Ingrid C. Bauer, Roberto Pignatelli
Publication date: 9 December 2009
Published in: Osaka Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0603094
involutionsurfaces of general typeautomorphism of order 2moduli space of surfaces with \(p_g=4\)non birational canonical map
Families, moduli, classification: algebraic theory (14J10) Surfaces of general type (14J29) Automorphisms of surfaces and higher-dimensional varieties (14J50)
Related Items (5)
Gorenstein Formats, Canonical and Calabi–Yau Threefolds ⋮ Surfaces with \(c_1^2 =9\) and \(\chi =5\) whose canonical classes are divisible by 3 ⋮ Surfaces with \(K^{2}=2X-2\) and \(p_{g} \geq 5\) ⋮ The moduli space of even surfaces of general type with \({K^2=8}\), \({p_g=4}\) and \({q=0}\) ⋮ Surfaces with χ = 5,K2 = 9 and a canonical involution
Cites Work
- Unnamed Item
- Unnamed Item
- On even surfaces of general type with \(K^2=8\), \(p_g=4\), \(q=0\)
- Surfaces of small degree
- Surfaces fibrées en courbes de genre deux
- Canonical surfaces with pg=pa=4 and \(K^ 2=\)5,\dots ,10
- Algebraic surfaces of general type with small \(c^2_1\). I
- Algebraic surfaces of general type with small \(c^2_1\). III
- Numerical inequalities for surfaces with canonical map composed with a pencil
- On the irregularity of special non-canonical surfaces
- Remarks on the bicanonical map for surfaces of general type
- On moduli of regular surfaces with \(K^2=8\) and \(p_q=4\)
- Classification of quadruple Galois canonical covers. II.
- The moduli space of surfaces with \(K^2 = 6\) and \(p_g = 4\)
- TRIPLE CANONICAL SURFACES OF MINIMAL DEGREE
- Surfaces with 𝐾²=7 and 𝑝_{𝑔}=4
- Fibrations of low genus, I
- Classification of quadruple Galois canonical covers I
- π1 OF ELLIPTIC AND HYPERELLIPTIC SURFACES
- THE BICANONICAL MAP OF SURFACES WITH $p_g = 0$ AND $K^2 \geqslant 7$, II
This page was built for publication: Surfaces with \(K^{2}=8, p_{g}=4\) and canonical involution
