New (Regge) symmetry relations for the Wigner 6_j-symbol

Abstract: The Wigner 6j–symbol, written in the formis shown to be invariant under separate permutations of A, B, C alone, separate permutations of α, β, γ alone and separate change in sign of any pair of α, β, γ; results equivalent to the new symmetry relations of Regge. Alternatively, written in the formwith J0 + J1 + J2 + J3 = K1 + K2 + K3, Jr(r = 0, 1, 2, 3) and K3 (s = 1, 2, 3) integral, it is invariant for separate permutations of the Jr and of the Ks. If Jm = max (J0, J1, J2, J3), then each 6j-symbol with distinct… Show more

Symmetries of quantum group coupling coefficients

Symmetries of quantum group coupling coefficients

Canonical forms of the generalized hypergeometric series for the 3j and the 6j symbol

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