A note on zero-cycles on bielliptic surfaces
Abstract
We study the Chow group of zero-cycles CH0(S) of a bielliptic surface S=(E1× E2)/G, where E1, E2 are elliptic curves and G is a finite group acting on E1 by translations and on E2 by automorphisms such that E2/G1. We show that if S is defined over an arbitrary field k of characteristic not equal to 2,3, then the kernel of the Albanese map albS:CH0(S)deg=0→ AlbS(k) is a torsion group of exponent 22·|G| or 32·|G|, depending on the type of bielliptic surface. We also construct explicit examples over p-adic fields that illustrate that this kernel can have nontrivial elements obtained by push-forward from the abelian surface.
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