Abstract
This chapter first describes how to compute the Hodge coniveau of complete intersections. It then explains a strategy to attack the generalized Hodge conjecture for complete intersections of coniveau 2. The guiding idea is that although the powerful method of the decomposition of the diagonal suggests that computing Chow groups of small dimension is the right way to solve the generalized Hodge conjecture, it might be better to invert the logic and try to compute the geometric coniveau directly. And indeed, this chapter culminates with the proof of the fact that for very general complete intersections, the generalized Hodge conjecture implies the generalized Bloch conjecture.
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