Correspondences acting on constant cycle curves on K3 surfaces

Abstract

Constant cycle curves on a K3 surface X over C have been introduced by Huybrechts (2014) as curves whose points all define the same class in the Chow group. In this paper we study correspondences Z ⊂eq X× X over C acting on the group ccc(X) of cycles generated by irreducible constant cycle curves. We construct for any n≥ 2 and any very ample line bundle L a locus Zn(L)⊂eq X× X of expected dimension 2, which yields a correspondence that acts on ccc(X), when it has the expected dimension. We provide examples of Zn(L) for low n and exhibit one correspondence different from Zn(L) acting on ccc(X).