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An explicit example of a noncrossed product division algebra
Author(s) -
Hanke Timo
Publication year - 2004
Publication title -
mathematische nachrichten
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.913
H-Index - 50
eISSN - 1522-2616
pISSN - 0025-584X
DOI - 10.1002/mana.200310181
Subject(s) - mathematics , quaternion algebra , iterated function , quaternion , division algebra , division ring , automorphism , algebra over a field , division (mathematics) , laurent series , field (mathematics) , pure mathematics , ring (chemistry) , crossed product , filtered algebra , arithmetic , mathematical analysis , geometry , chemistry , organic chemistry
The paper presents an explicit example of a noncrossed product division algebra of index and exponent 8 over the field ℚ( s )( t ). It is an iterated twisted function field in two variables D ( x, σ )( y, τ ) over a quaternion division algebra D which is defined over the number field ℚ(√3,√−7). The automorphisms σ and τ are computed by solving relative norm equations in extensions of number fields. The example is explicit in the sense that its structure constants are known. Moreover, it is pointed out that the same arguments also yield another example, this time over the field ℚ(( s ))(( t )), given by an iterated twisted Laurent series ring D (( x, σ ))(( y, τ )) over the same quaternion division algebra D . (© 2004 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)