More Examples of Non-Rational Adjoint Groups
Abstract
We give a recursive construction to produce examples of quadratic forms qn in the n-th power of the fundamental ideal in the Witt ring whose corresponding adjoint groups PSO(qn) are not stably rational. Computations of the R-equivalence classes of adjoint classical groups by A.S. Merkurjev are used to show that these groups are not R-trivial. This extends earlier results of A.S. Merkurjev and P.Gille where the forms considered have non-trivial and trivial discriminants respectively.
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