Three-qutrit entanglement and simple singularities

Abstract

In this paper, we use singularity theory to study the entanglement nature of pure three-qutrit systems. We first consider the algebraic variety X of separable three-qutrit states within the projective Hilbert space P(H) = P26. Given a quantum pure state |∈ P(H) we define the X-hypersuface by cutting X with a hyperplane H defined by the linear form | (the X-hypersurface of X is X H ⊂ X). We prove that when | ranges over the SLOCC entanglement classes, the "worst" possible singular X-hypersuface with isolated singularities, has a unique singular point of type D4.