Ruprecht-Karls-Universität Heidelberg
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„Families of p-adic L-functions for Bianchi modular forms and applications“
Dr. Daniel Barrera Salazar, UPC Barcelona

Bianchi Modular forms are the automorphic forms attached to the reductive group GL_{2} over K where K is a imaginary quadratic field. In this talk I will explain a construction of families of p-adic L-functions deforming p-adic L-functions attached to a Bianchi cusp forms which are non-critical or base change from GL_{2} over Q. This construction is based on the local study at classical points of the Eigenvariety attached to GL_{2} over K. As an application of this, in the base change case we prove a p-adic analogue of the Artin formalism for complex L-functions. This is joint work with Chris Williams.

Freitag, den 18. Mai 2018 um 13:30 Uhr, in INF205, SR A Freitag, den 18. Mai 2018 at 13:30, in INF205, SR A

Der Vortrag folgt der Einladung von The lecture takes place at invitation by Professor Dr. Gebhard Böckle