Torsors of isotropic reductive groups over Laurent polynomials

Abstract

Let k be a field of characteristic 0. Let G be a reductive group over the ring of Laurent polynomials R=k[x1 1,...,xn 1]. We prove that G has isotropic rank >=1 over R iff it has isotropic rank >=1 over the field of fractions k(x1,...,xn) of R, and if this is the case, then the natural map H1et(R,G) H1(k(x1,...,xn),G) has trivial kernel, and G is loop reductive, i.e. contains a maximal R-torus. In particular, we settle in positive the conjecture of V. Chernousov, P. Gille, and A. Pianzola that H1Zar(R,G)=* for such groups G. We also deduce that if G is a reductive group over R of isotropic rank >=2, then the natural map of non-stable K1-functors K1G(R) K1G( k((x1))...((xn)) ) is injective, and an isomorphism if G is moreover semisimple.