The Minus Conjecture revisited

• Authors: GREITHER Cornelius; KUČERA Radan
• Year of publication: 2009
• Type: Article in Periodical
• Magazine / Source: Journal für die reine und angewandte Mathematik
• MU Faculty or unit: Faculty of Science
• Web: http://www.reference-global.com/doi/abs/10.1515/CRELLE.2009.053
• Field: General mathematics
• Keywords: Stark units; regulators; Gross conjecture on tori
• Description: In an earlier paper we proved some results concerning Gross's conjecture on tori. This conjecture, which we call the Minus Conjecture, is closely related to a conjecture of Burns, which is now known to hold generally in the absolutely abelian setting; however Burns' conjecture does not directly imply the Minus Conjecture. The result proved in the earlier paper was concerned with imaginary absolutely abelian extensions K/Q of the form K=FK⁺, with F imaginary quadratic and K⁺/Q being tame, l-elementary and ramified at most at two primes. In the present paper we complement these results by proving the Minus Conjecture for extensions K/Q as above but without any restriction on the number s of ramified primes. The price we have to pay for this generality is that our proof only works if the odd prime l>=3(s+1) and l does not divide h_F.

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