Quantum entanglement and contextuality with complexifications of E8 root system

Abstract

The Witting configuration with 40 complex rays was suggested as a possible reformulation of Penrose model with two spin-3/2 systems based on geometry of dodecahedron and used for analysis of nonlocality and contextuality in quantum mechanics. Yet another configuration with 120 quantum states is considered in presented work. Despite of different number of states both configurations can be derived from complexification of 240 minimal vectors of 8D real lattice corresponding to root system of Lie algebra E8. An analysis of properties of suggested configuration of quantum states is provided using many analogies with properties of Witting configuration.