On structure of \(T,U,V\)-isospins in theory of higher symmetry (Q2719431)

The author provides an invariant description of the subalgebras of \(T,U,V\)-spins of the algebra \(su(3)\) connected with the unitary symmetry group \(S\mathcal U(3)\). It is shown that in the general theory of unitary symmetry these subalgebras are introduced in a noninvariant manner by means of some generators of a concrete matrix representation. Although, if \(T,U,V\)-spin structure has a physical meaning, it should be described by means of its Lie algebra (or group) only, without any concrete representation, that is in an invariant way. Some possible applications of the developed theory are discussed.