On the splitting of surfaces in motivic stable homotopy category

Abstract

Let k be a perfect field and X be a smooth projective surface over k with a rational point, we discuss the condition of splitting off the top cell for the motivic stable homotopy type of X. We also study some outlying examples, such as K3 surfaces. When k is an algebraically field with characteristic not equal to 2, we can give an alternative proof of the splitting result of curves and also understand the splittings of Calabi-Yau surfaces via the motivic Hurewicz theorem and decomposition of the Chow-Witt correspondences.