Authors: Bin Wang
This paper includes two main chapters, \S 2 and \S3. Each deals with one type of algebraic Poincar\'e duality (APD) on linear spaces originated from algebraic cycles. Two types of APD confirm the following conjectures: (1) the Griffiths' conjecture on the incidence equivalence versus Abel-Jacobi equivalence. (2) the standard conjectures including the ``D" conjecture over $\mathbb C$.
Comments: 25 Pages. This is the second of three papers, all of which are posted on this site.
[v1] 2016-05-30 15:53:54
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