Local-global principle for quadratic forms over fraction fields of two-dimensional henselian domains

Abstract

Let R be a 2-dimensional normal excellent henselian local domain in which 2 is invertible and let L and k be respectively its fraction field and residue field. Let R be the set of rank 1 discrete valuations of L corresponding to codimension 1 points of regular proper models of R. We prove that a quadratic form q over L satisfies the local-global principle with respect to R in the following two cases: (1) q has rank 3 or 4; (2) q has rank 5 and R=A[y], where A is a complete discrete valuation ring with a not too restrictive condition on the residue field k, which is satisfied when k is C1.