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Stark’s Conjectures: Recent Work and New Directions
About this Title
David Burns, Jonathan Sands and David Solomon, Editors
Publication: Contemporary Mathematics
Publication Year:
2004; Volume 358
ISBNs: 978-0-8218-3480-0 (print); 978-0-8218-7948-1 (online)
DOI: https://doi.org/10.1090/conm/358
MathSciNet review: 2090725
ReadershipTable of Contents
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Front/Back Matter
Articles
- Cristian D. Popescu – Rubin’s integral refinement of the abelian Stark conjecture [MR 2088710]
- D. S. Dummit – Computations related to Stark’s conjecture [MR 2088711]
- Cornelius Greither – Arithmetic annihilators and Stark-type conjectures [MR 2088712]
- Matthias Flach – The equivariant Tamagawa number conjecture: a survey [MR 2088713]
- Jonathan W. Sands – Popescu’s conjecture in multi-quadratic extensions [MR 2088714]
- D. Solomon – Abelian conjectures of Stark type in ${\Bbb Z}_p$-extensions of totally real fields [MR 2088715]
- H. M. Stark – The derivative of $p$-adic Dirichlet series at $s=0$ [MR 2088716]
- John Tate – Refining Gross’s conjecture on the values of abelian $L$-functions [MR 2088717]
- David R. Hayes – Stickelberger functions for non-abelian Galois extensions of global fields [MR 2063780]
- Barry Mazur and Karl Rubin – Introduction to Kolyvagin systems [MR 2088718]