The Geometry of Rank Drop in a Class of Face-Splitting Matrix Products
Abstract
Given k ≤ 6 points (xi,yi) ∈ P2 × P2, we characterize rank deficiency of the k × 9 matrix Zk with rows xi yi in terms of the geometry of the point configurations \xi\ and \yi\. While this question comes from computer vision the answer relies on tools from classical algebraic geometry: For k ≤ 5, the geometry of the rank-drop locus is characterized by cross-ratios and basic (projective) geometry of point configurations. For the case k=6 the rank-drop locus is captured by the classical theory of cubic surfaces.
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