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Published online by Cambridge University Press: 22 January 2016
The present note is intended to be a supplement to [9], in which the following is proven: Let V be a smooth projective variety over the field of complex numbers C, T a smooth quasi-projective variety, Z a cycle in T × V of codimension p. If Z(t) is l-cube equivalent to zero for general t e T, then, setting r = dim V − p,
vanishes for l′ < l, where {tZ} is the correspondence defined by Z.