Bloch’s conjecture for Inoue surfaces with $p_g=0$, $K^2 = 7$
From MaRDI portal
Publication:3190317
DOI10.1090/S0002-9939-2014-12246-5zbMath1325.14021arXiv1210.4287WikidataQ123099719 ScholiaQ123099719MaRDI QIDQ3190317
Publication date: 16 September 2014
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1210.4287
Surfaces of general type (14J29) Algebraic cycles (14C25) Automorphisms of surfaces and higher-dimensional varieties (14J50)
Related Items (5)
On symplectic automorphisms of elliptic surfaces acting on \(\mathrm{CH}_0\) ⋮ A new family of surfaces of general type with \(K^2 = 7\) and \(p_g = 0\) ⋮ A two-dimensional family of surfaces of general type with \(p_g = 0\) and \(K^2 = 7\) ⋮ Bloch's conjecture for generalized Burniat type surfaces with \(p_g=0\) ⋮ Commuting involutions on surfaces of general type with \(p_g=0\) and \(K^2=7\)
Cites Work
- Unnamed Item
- Unnamed Item
- Burniat surfaces. III: Deformations of automorphisms and extended Burniat surfaces
- Chow groups are finite dimensional, in some sense
- Rational equivalence of zero cycles for some more surfaces with \(p_ g=0\)
- Rational equivalence of 0-cycles on some surfaces of general type with \(p_g=0\)
- Some new surfaces of general type
- A new family of surfaces of general type with \(K^2 = 7\) and \(p_g = 0\)
- Involutions on a surface of general type with \(p_{g} = q = 0\), \(K^{2} = 7\)
- Sur les surfaces de genre \(P_{12} > 1\)
- Kulikov surfaces form a connected component of the moduli space
- Quotients of products of curves, new surfaces with <i>p<sub>g</sub></i> = 0 and their fundamental groups.
- THE BICANONICAL MAP OF SURFACES WITH pg = 0 AND K2 [ges 7]
- K2of artinian Q-algebras, with application to algebraic cycles
- THE BICANONICAL MAP OF SURFACES WITH $p_g = 0$ AND $K^2 \geqslant 7$, II
- Rational Surfaces with Many Nodes
- Some bidouble planes with pg= q = 0 and 4 ≤ K2≤ 7
- Inoue type manifolds and Inoue surfaces: a connected component of the moduli space of surfaces with $K^2=7, p_g = 0$
- The classification of surfaces of general type with nonbirational bicanonical map
This page was built for publication: Bloch’s conjecture for Inoue surfaces with $p_g=0$, $K^2 = 7$
