A p-adic adjoint L-function and the ramification locus of the Hilbert modular eigenvariety

Bergdall, John; BALASUBRAMANYAM, BASKAR; Longo, Matteo

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dc.contributor.author	BALASUBRAMANYAM, BASKAR	en_US
dc.contributor.author	Bergdall, John	en_US
dc.contributor.author	Longo, Matteo	en_US
dc.date.accessioned	2026-04-09T12:24:40Z
dc.date.available	2026-04-09T12:24:40Z
dc.date.issued	2025-09	en_US
dc.identifier.citation	Tunisian Journal of Mathematics, 37 (3-4), 515-588.	en_US
dc.identifier.issn	2576-7666	en_US
dc.identifier.issn	2576-7658	en_US
dc.identifier.uri	https://doi.org/10.2140/tunis.2025.7.515	en_US
dc.identifier.uri	http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/10855
dc.description.abstract	Let F be a totally real field and E the middle-degree eigenvariety for Hilbert modular forms over F, constructed by Bergdall and Hansen. We study the ramification locus of E in relation to the p-adic properties of adjoint L-values. The connection between the two is made via an analytic twisted Poincaré pairing over affinoid weights, which interpolates the classical twisted Poincaré pairing for Hilbert modular forms, itself known to be related to adjoint L-values by works of Ghate and Dimitrov. The overall strategy connecting the pairings to ramification is based on the theory of L-ideals, which was used by Bellaïche and Kim in the case where F = Q.	en_US
dc.language.iso	en	en_US
dc.publisher	Mathematical Sciences Publishers	en_US
dc.subject	Knot group	en_US
dc.subject	variety of representations	en_US
dc.subject	deformations of reducible representations	en_US
dc.subject	2025	en_US
dc.title	A p-adic adjoint L-function and the ramification locus of the Hilbert modular eigenvariety	en_US
dc.type	Article	en_US
dc.contributor.department	Dept. of Mathematics	en_US
dc.identifier.sourcetitle	Tunisian Journal of Mathematics	en_US
dc.publication.originofpublisher	Foreign	en_US