Exterior-Model Spinors in Split Rank: Exact Levi Images and Square-Determinant Obstructions

Abstract

Let K be a field with 2 ∈ K×, and let HW denote the standard hyperbolic form on W W*. We study the exterior spinor model S = V(W) together with the spin-to-orthogonal map for this split form, keeping the chosen hyperbolic presentation explicit. The main results determine the field-sensitive part of the split Levi image. In positive split rank the kernel of Spin(V,Q) SO(V,Q) is \ 1\; therefore the exterior spinor action descends to the orthogonal image only projectively. For the split line the image of Spin(HK) SO(HK) is precisely the square-scaling subgroup. In arbitrary split rank we construct explicit Clifford representatives for hyperbolic transvections and chosen-line square scalings, prove the weight-2 torus conjugation law, and show that any split Levi lift acts on V(W) as a scalar multiple of the natural exterior action. If (g) ∈ u2, the transported Levi element g = (g, g-) admits an explicit even unitary Clifford lift acting as u-1 (g) on S. In finite split rank at least three, if HW ∈ im(Spin(HW) SO(HW)), then gHW ∈ (g) · K× 2. Equivalently, the spin image meets the split Levi subgroup exactly in its square-determinant subgroup. This recovers, by direct Clifford calculation, the determinant-modulo-squares spinor-norm criterion on the split Levi.