Constructing SU(2) x U(1) orbit space for qutrit mixed states

Abstract

The orbit space P(R8)/G, of the group G:=SU(2)× U(1)⊂U(3) acting adjointly on the state space P(R8) of a 3-level quantum system is discussed. The semi-algebraic structure of P(R8) /G, is determined within the Procesi-Schwarz method. Using the integrity basis for the ring of G-invariant polynomials, R[P(R8)]G, the set of constraints on the Casimir invariants of U(3) group coming from the positivity requirement of Procesi-Schwarz gradient matrix, Grad(z)≥slant 0, is analyzed in details.