The Rank of the Normal Functions of the Ceresa and Gross-Schoen Cycles
Publication
, Journal Article
Hain, R
Published in: Forum of Mathematics Sigma
September 8, 2025
In this paper we show that the rank of the normal function function of the genus Ceresa cycle over the moduli space of curves has the maximal rank possible, provided that. In genus 3 we show that the Green-Griffiths invariant of this normal function is a TeichmÜller modular form of weight and use this to show that the rank of the Ceresa normal function is exactly 1 along the hyperelliptic locus. We also introduce new techniques and tools for studying the behaviour of normal functions along and transverse to boundary divisors. These include the introduction of residual normal functions and the use of global monodromy arguments to compute them.
Duke Scholars
Published In
Forum of Mathematics Sigma
DOI
EISSN
2050-5094
Publication Date
September 8, 2025
Volume
13
Related Subject Headings
- 4904 Pure mathematics
- 4901 Applied mathematics
Citation
APA
Chicago
ICMJE
MLA
NLM
Hain, R. (2025). The Rank of the Normal Functions of the Ceresa and Gross-Schoen Cycles. Forum of Mathematics Sigma, 13. https://doi.org/10.1017/fms.2025.10089
Hain, R. “The Rank of the Normal Functions of the Ceresa and Gross-Schoen Cycles.” Forum of Mathematics Sigma 13 (September 8, 2025). https://doi.org/10.1017/fms.2025.10089.
Hain R. The Rank of the Normal Functions of the Ceresa and Gross-Schoen Cycles. Forum of Mathematics Sigma. 2025 Sep 8;13.
Hain, R. “The Rank of the Normal Functions of the Ceresa and Gross-Schoen Cycles.” Forum of Mathematics Sigma, vol. 13, Sept. 2025. Scopus, doi:10.1017/fms.2025.10089.
Hain R. The Rank of the Normal Functions of the Ceresa and Gross-Schoen Cycles. Forum of Mathematics Sigma. 2025 Sep 8;13.
Published In
Forum of Mathematics Sigma
DOI
EISSN
2050-5094
Publication Date
September 8, 2025
Volume
13
Related Subject Headings
- 4904 Pure mathematics
- 4901 Applied mathematics