Quintic surface over \(p\)-adic local fields with infinite \(p\)-primary torsion in the Chow group of 0-cycles (Q2906496)

For a smooth projective variety \(X\) over a number field, the Chow group \(\text{CH}^r(X)\) of codimension \(r\geq 2\) is not known to be a finitely generated \(\mathbb{Z}\)-module. When the base field is a \(p\)-adic local field, however the torsion part of \(\text{CH}^r(X)\) had been expected to be finite. \textit{S. Saito} and the author constructed in [Algebra Number Theory 1, No. 2, 163--181 (2007; Zbl 1161.14300)] a surface such that the \(l\)-primary torsion part \(\text{CH}_0(X)[l^{\infty}]\) is infinite for \(l\neq p\). The purpose of this paper is to construct a quintic surface \(X\) over \(\mathbb{Q}_p\) such that the \(p\)-primary torsion part \(\text{CH}_0(X\times_{\mathbb{Q}_p}K)[p^{\infty}]\) is infinite for arbitrary finite extension \(K\) of \(\mathbb{Q}_p\).NEWLINENEWLINEFor the entire collection see [Zbl 1242.14001].