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We study the Abel-Jacobi image of the Ceresa cycle W₊, ₄-W₊, ₄^-, where W₊, ₄ is the image of the kth symmetric product of a curve X with a base point e on its Jacobian variety. For certain Fermat quotient curves of genus g, we prove that for any choice of the base point and k g-2, the Abel-Jacobi image of the Ceresa cycle is non-torsion. In particular, these cycles are non-torsion modulo rational equivalence.
Yusuke Nemoto (Wed,) studied this question.