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Intertwining matrices for number fields: Supplement to “Intertwiners and the K-theory of commutative rings”
-
A. J Berrick
and
M.-F Lim
Published/Copyright:
February 12, 2007
Abstract
Since not all the matrices appearing in [A. J. Berrick, Intertwiners and the K-theory of commutative rings, J. reine angew. Math. 569 (2004), 55–101.], Proposition 10.4 are intertwining matrices as claimed, we present a corrected version here. Moreover, with only a little extra work, we then generalize the result from quadratic to arbitrary number fields.
Received: 2005-09-13
Revised: 2005-12-21
Published Online: 2007-02-12
Published in Print: 2006-12-19
© Walter de Gruyter
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Articles in the same Issue
- Classes réalisables d'extensions non abéliennes
- The large sieve, monodromy and zeta functions of curves
- Spectral estimates and non-selfadjoint perturbations of spheroidal wave operators
- A polynomial divisor problem
- Non-archimedean amoebas and tropical varieties
- Intertwining matrices for number fields: Supplement to “Intertwiners and the K-theory of commutative rings”
- An asymptotic formula for real groups
