Energies and derivative couplings in the vicinity of a conical intersection 3. The 'most' diabatic basis

Abstract

It is shown that in the immediate vicinity of an arbitrary conical intersection at R _x all the derivative coupling, except for the small part due to the finiteness of the basis sets, is removable by the orthogonal transformation generated by the angle α(ρ, θ, z) = λ(θ) /2 + ρm_ρ (θ) /q(θ) + zm_z (θ) /q(θ), where ρ,θ,z are cylindrical polar coordinates centred at R _x . Expressions for λ(θ), q(θ) m_ρ (θ) and m_z (θ) are given. The implications of this result for numerical studies that (i) determine the ‘most’ diabatic basis using Poisson's equation and (ii) assess approximate diabatization schemes are discussed.