Nonsimilar half-neighbors over fields of characteristic 2

Abstract

The total isotropy index of a quadratic form φ over a field F is the maximum dimension of any totally isotropic subspace of φ. If φ is anisotropic and ψ is another anisotropic quadratic form over F of the same dimension, then φ and ψ are called Vishik-equivalent if, over any field extension E/F, their total isotropy indices are the same. In characteristic ≠ 2, Vishik-equivalence implies similarity in all dimensions ≤ 7 and in all odd dimensions, but there are counterexamples in all even dimensions ≥ 8. In this paper, we construct semi-singular anisotropic quadratic forms of dimension 2m for any m≥ 3 and defined over a suitable extension of any given field F0 of characteristic 2 that are Vishik-equivalent but not similar, thus completing the list of such examples provided earlier by the first author and Kristýna Zemková.