Patrick Brosnan, Hao Fang, Zhaohu Nie, Gregory Pearlstein
Published 2007-11-06, updated 2008-02-18Version 2
In a recent paper, M. Green and P. Griffiths used R. Thomas' works on nodal hypersurfaces to establish the equivalence of the Hodge conjecture and the existence of certain singular admissible normal functions. Inspired by their work, we study normal functions using M. Saito's mixed Hodge modules and prove that the existence of singularities of the type considered by Griffiths and Green is equivalent to the Hodge conjecture. Several of the intermediate results, including a relative version of the weak Lefschetz theorem for perverse sheaves, are of independent interest.
Comments: 23 pages. Added section describing the behavior of singularities under blowing up. This connects our work directly with that of Green and Griffiths
Singularities of variations of mixed Hodge structure
On the Hodge conjecture for hypersurfaces in toric varieties
Counterexample to the Hodge Conjecture
![QR code for arXiv:0711.0964 [math.AG]](http://oss.arxitics.com/images/favicon.svg)