Multipole operators for an arbitrary number of spins

Abstract

Basis states and operators composed of n, in general, different nuclear spins of integer or half‐integer values are explicitly constructed. Various coupling schemes are discussed, and transformations between them derived. Following this, a complete set of irreducible tensor operators T^(k)_{V} is constructed which can be used as a basis for expanding operators which depend on n nuclear spins. It is further shown that decomposition of the tensor’s components T^(k)q_{V} into a sum of products of two irreducible tensor components involves transformation matrices between different coupling schemes. Various properties and commutation relations of the T^(k)q_{V}’s are given along with a discussion of their reduced matrix elements.