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QUADRATIC ENRICHMENT OF THE LOGARITHMIC DERIVATIVE OF THE ZETA FUNCTION

Publication ,  Journal Article
Bilu, M; Ho, W; Srinivasan, P; Vogt, I; Wickelgren, K
Published in: Transactions of the American Mathematical Society Series B
January 1, 2024
Published version (DOI)

We define an enrichment of the logarithmic derivative of the zeta function of a variety over a finite field to a power series with coefficients in the Grothendieck–Witt group. We show that this enrichment is related to the topology of the real points of a lift. For cellular schemes over a field, we prove a rationality result for this enriched logarithmic derivative of the zeta function as an analogue of part of the Weil conjectures. We also compute several examples, including toric varieties, and show that the enrichment is a motivic measure.

Duke Scholars

Kirsten Graham Wickelgren
Author Kirsten Graham Wickelgren Mathematics
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Published In

Transactions of the American Mathematical Society Series B

DOI

10.1090/btran/201

EISSN

2330-0000

Publication Date

January 1, 2024

Volume

11

Start / End Page

1183 / 1225
 

Citation

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ICMJE
MLA
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Bilu, M., Ho, W., Srinivasan, P., Vogt, I., & Wickelgren, K. (2024). QUADRATIC ENRICHMENT OF THE LOGARITHMIC DERIVATIVE OF THE ZETA FUNCTION. Transactions of the American Mathematical Society Series B, 11, 1183–1225. https://doi.org/10.1090/btran/201
Bilu, M., W. Ho, P. Srinivasan, I. Vogt, and K. Wickelgren. “QUADRATIC ENRICHMENT OF THE LOGARITHMIC DERIVATIVE OF THE ZETA FUNCTION.” Transactions of the American Mathematical Society Series B 11 (January 1, 2024): 1183–1225. https://doi.org/10.1090/btran/201.
Bilu M, Ho W, Srinivasan P, Vogt I, Wickelgren K. QUADRATIC ENRICHMENT OF THE LOGARITHMIC DERIVATIVE OF THE ZETA FUNCTION. Transactions of the American Mathematical Society Series B. 2024 Jan 1;11:1183–225.
Bilu, M., et al. “QUADRATIC ENRICHMENT OF THE LOGARITHMIC DERIVATIVE OF THE ZETA FUNCTION.” Transactions of the American Mathematical Society Series B, vol. 11, Jan. 2024, pp. 1183–225. Scopus, doi:10.1090/btran/201.
Bilu M, Ho W, Srinivasan P, Vogt I, Wickelgren K. QUADRATIC ENRICHMENT OF THE LOGARITHMIC DERIVATIVE OF THE ZETA FUNCTION. Transactions of the American Mathematical Society Series B. 2024 Jan 1;11:1183–1225.

Published In

Transactions of the American Mathematical Society Series B

DOI

10.1090/btran/201

EISSN

2330-0000

Publication Date

January 1, 2024

Volume

11

Start / End Page

1183 / 1225