On the products of bipolar harmonics

Abstract

The products of the two and three bipolar harmonics Y1 2LM( r31, r32) are represented as the finite sums of powers of the three relative coordinates r32, r31 and r21. The complete (angular+radial) integrals of the products of the two and three bipolar harmonics in the basis of exponential radial functions are expressed as finite sums of the auxiliary three-particle integrals n,k,l(α, β, γ). The formulas derived in this study can be used to accelerate highly accurate computations of the rotationally excited (bound) states in arbitrary three-body systems. In particular, we have constructed compact (400-term) variational wave functions for the triplet and singlet 2P(L = 1)-states in light two-electron atoms and ions. Highly accurate calculations (20 - 21 stable decimal digits in the total energy) of the triplet and singlet 2P(L = 1)-states in the two-electron Li+, Be2+, B3+ and C4+ ions are performed for the first time