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Rigidity for Henselian local rings and A 1 representable theories
 Math. Zeit
"... Abstract. We prove that for a large class of A 1representable theories including all orientable theories it is possible to construct transfer maps and to prove rigidity theorems in the style of Gabber. This generalizes results of Panin and Yagunov obtained over algebraically closed fields to arbitr ..."
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Abstract. We prove that for a large class of A 1representable theories including all orientable theories it is possible to construct transfer maps and to prove rigidity theorems in the style of Gabber. This generalizes results of Panin and Yagunov obtained over algebraically closed fields to arbitrary infinite ones.
Periodicity of hermitian Kgroups
 In preparation
"... 0. Introduction and statements of main results By the fundamental work of Bott [10] it is known that the homotopy groups of classical Lie groups are periodic, of period 2 or 8. For instance, the general linear and symplectic groups satisfy the isomorphisms: πn(GL(R)) ∼ = πn+8(GL(R)) ..."
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Cited by 3 (3 self)
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0. Introduction and statements of main results By the fundamental work of Bott [10] it is known that the homotopy groups of classical Lie groups are periodic, of period 2 or 8. For instance, the general linear and symplectic groups satisfy the isomorphisms: πn(GL(R)) ∼ = πn+8(GL(R))