This is the only ${{\mathit \Xi}}$ resonance whose properties are all reasonably well known. Assuming that the ${{\mathit \Lambda}_{{{c}}}^{+}}$ has $\mathit J{}^{P} = 1/2{}^{+}$, AUBERT 2008AK, in a study of ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Xi}^{-}}{{\mathit \pi}^{+}}{{\mathit K}^{+}}$, finds conclusively that the spin of the ${{\mathit \Xi}{(1530)}^{0}}$ is 3/2. In conjunction with SCHLEIN 1963B and BUTTON-SHAFER 1966, this proves also that the parity is $\text{+}$. We use only those determinations of the mass and width that are accompanied by some discussion of systematics and resolution.
