On the Bloch—Kato conjecture for genus 2 Siegel modular forms
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 Sarah Zerbes Tuesday 03 December 2019, 16:00-17:00 MR12.
If you have a question about this talk, please contact Jack Thorne.
I will outline a proof of new cases of the Bloch—Kato conjecture for genus 2 Siegel modular forms in analytic rank 0. It is the consequence of an explicit reciprocity law for the GSp(4) Euler system, which relates the image of the Euler system under the syntomic regulator to the spin p-adic L-function constructed in David’s talk. This is joint work with David and Chris Skinner.
This talk is part of the Number Theory Seminar series.
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