Abstract
We consider surfaces of geometric genus $3$ with the property that their transcendental cohomology splits into $3$ pieces, each piece coming from a $K3$ surface. For certain families of surfaces with this property, we can show there is a similar splitting on the level of Chow groups (and Chow motives).
Citation
Robert Laterveer. "Algebraic cycles and triple $K3$ burgers." Ark. Mat. 57 (1) 157 - 189, April 2019. https://doi.org/10.4310/ARKIV.2019.v57.n1.a9