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CONSTRAINED FIT INFORMATION show precise values?

An overall fit to 56 branching ratios uses 87 measurements to determine 26 parameters. The overall fit has a $\chi {}^{2}$ = 61.2 for 61 degrees of freedom.     The following off-diagonal array elements are the correlation coefficients <$\mathit \delta $p$_{i}\delta $p$_{j}$> $/$ ($\mathit \delta $p$_{i}\cdot{}\delta $p$_{j}$), in percent, from the fit to parameters ${{\mathit p}_{{{i}}}}$, including the branching fractions, $\mathit x_{i}$ = $\Gamma _{i}$ $/$ $\Gamma _{total}$.

x1  100  x3    100  x17      100  x23        100  x24          100  x26            100  x34              100  x35                100  x36                  100  x45                    100  x50                      100  x52                        100  x56                          100  x65                            100  x69                              100  x71                                100  x73                                  100  x76                                    100  x78                                      100  x81                                        100  x82                                          100  x85                                            100  x87                                              100  x90                                                100  x91                                                  100  x94                                                    100     x1   x3   x17   x23   x24   x26   x34   x35   x36   x45   x50   x52   x56   x65   x69   x71   x73   x76   x78   x81   x82   x85   x87   x90   x91   x94

Mode  Fraction (Γi / Γ) Scale factor Γ1  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit K}_S^0}$   ($1.63$ $\pm0.07$) $ \times 10^{-2}$  1.1 Γ3  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit K}^{-}}{{\mathit \pi}^{+}}$  ($6.37$ $\pm0.21$) $ \times 10^{-2}$  1.2 Γ17  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit K}_S^0}$ ${{\mathit \pi}^{0}}$  ($2.12$ $\pm0.09$) $ \times 10^{-2}$  1.3 Γ23  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\overline{\mathit K}}^{0}}{{\mathit \eta}}$  ($9.0$ $\pm0.6$) $ \times 10^{-3}$  1.1 Γ24  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit K}_S^0}$ ${{\mathit \pi}^{+}}{{\mathit \pi}^{-}}$  ($1.63$ $\pm0.10$) $ \times 10^{-2}$  1.1 Γ26  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit K}^{-}}{{\mathit \pi}^{+}}{{\mathit \pi}^{0}}$  ($4.54$ $\pm0.27$) $ \times 10^{-2}$  1.6 Γ34  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit \eta}}$  ($1.49$ $\pm0.08$) $ \times 10^{-3}$  1.0 Γ35  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit \eta}^{\,'}}$  ($4.9$ $\pm0.9$) $ \times 10^{-4}$  Γ36  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit \omega}{(782)}^{0}}$  ($9.0$ $\pm1.0$) $ \times 10^{-4}$  1.2 Γ45  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit p}}{{\mathit \phi}}$  ($1.06$ $\pm0.13$) $ \times 10^{-3}$  1.1 Γ50  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Lambda}}{{\mathit \pi}^{+}}$  ($1.32$ $\pm0.05$) $ \times 10^{-2}$  1.1 Γ52  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Lambda}}{{\mathit \pi}^{+}}{{\mathit \pi}^{0}}$  ($7.16$ $\pm0.33$) $ \times 10^{-2}$  1.0 Γ56  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Lambda}}{{\mathit \pi}^{-}}$2 ${{\mathit \pi}^{+}}$  ($3.69$ $\pm0.26$) $ \times 10^{-2}$  1.5 Γ65  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Lambda}}{{\mathit \pi}^{+}}{{\mathit \eta}}$  ($1.92$ $\pm0.06$) $ \times 10^{-2}$  Γ69  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Lambda}}{{\mathit K}^{+}}{{\overline{\mathit K}}^{0}}$  ($5.9$ $\pm0.5$) $ \times 10^{-3}$  1.2 Γ71  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{0}}{{\mathit \pi}^{+}}$  ($1.29$ $\pm0.05$) $ \times 10^{-2}$  1.1 Γ73  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{+}}{{\mathit \pi}^{0}}$  ($1.27$ $\pm0.10$) $ \times 10^{-2}$  1.1 Γ76  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{+}}{{\mathit \pi}^{+}}{{\mathit \pi}^{-}}$  ($4.57$ $\pm0.18$) $ \times 10^{-2}$  1.1 Γ78  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{-}}$2 ${{\mathit \pi}^{+}}$  ($1.87$ $\pm0.18$) $ \times 10^{-2}$  Γ81  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{0}}{{\mathit \pi}^{-}}$2 ${{\mathit \pi}^{+}}$  ($1.13$ $\pm0.31$) $ \times 10^{-2}$  Γ82  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{+}}{{\mathit \omega}}$  ($1.72$ $\pm0.20$) $ \times 10^{-2}$  Γ85  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{+}}{{\mathit K}^{+}}{{\mathit K}^{-}}$  ($3.66$ $\pm0.35$) $ \times 10^{-3}$  1.1 Γ87  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Sigma}^{+}}{{\mathit \phi}}$  ($4.0$ $\pm0.5$) $ \times 10^{-3}$  1.1 Γ90  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Xi}^{0}}{{\mathit K}^{+}}$  ($5.5$ $\pm0.7$) $ \times 10^{-3}$  Γ91  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Xi}^{-}}{{\mathit K}^{+}}{{\mathit \pi}^{+}}$  ($6.3$ $\pm0.5$) $ \times 10^{-3}$  1.0 Γ94  ${{\mathit \Lambda}_{{{c}}}^{+}}$ $\rightarrow$ ${{\mathit \Xi}{(1530)}^{0}}{{\mathit K}^{+}}$  ($4.9$ $\pm0.6$) $ \times 10^{-3}$  1.1

 

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