Robert Pollack, Tom Weston
Published 2006-10-23Version 1
Let f be a modular form of weight 2 and trivial character. Fix also an imaginary quadratic field K. We use work of Bertolini-Darmon and Vatsal to study the mu-invariant of the p-adic Selmer group of f over the anticyclotomic Zp-extension of K. In particular, we verify the mu-part of the main conjecture in this context. The proof of this result is based on an analysis of congruences of modular forms, leading to a conjectural quantitative version of level-lowering (which we verify in the case that Mazur's principle applies).
On Ihara's lemma for degree one and two cohomology over imaginary quadratic fields
On congruent primes and class numbers of imaginary quadratic fields
An Eisenstein ideal for imaginary quadratic fields and the Bloch-Kato conjecture for Hecke characters
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