Belle: INSPIRE
Comment: Used BR( Y(4S) -> B+ B- ) = BR( Y(4S) -> B0 B0bar ) = 0.5
Parameter | Measurement |
---|---|
\({\cal{B}} ( \bar{B}^0 \to \Lambda_c^+ \bar{p} \pi^+ \pi^- )\) | \([11.0 ^{+1.2}_{-1.2}\mbox{ (stat)} \pm 1.9\mbox{ (syst)} \pm 2.9\mbox{ (Lambdac+ BF)}] \times 10^{-4}\) |
\({\cal{B}} ( B^- \to \Lambda_c^+ \bar{p} \pi^- )\) | \([1.87 ^{+0.43}_{-0.40}\mbox{ (stat)} \pm 0.28\mbox{ (syst)} \pm 0.49\mbox{ (Lambdac+ BF)}] \times 10^{-4}\) |
\({\cal{B}} ( \bar{B}^0 \to \Sigma_c^{++} \bar{p} \pi^- )\) | \([2.38 ^{+0.63}_{-0.55}\mbox{ (stat)} \pm 0.41\mbox{ (syst)} \pm 0.62\mbox{ (Lambdac+ BF)}] \times 10^{-4}\) (superseded) |
\({\cal{B}} ( \bar{B}^0 \to \Sigma_c^{*++} \bar{p} \pi^- )\) | \([1.63 ^{+0.57}_{-0.51}\mbox{ (stat)} \pm 0.28\mbox{ (syst)} \pm 0.42\mbox{ (Lambdac+ BF)}] \times 10^{-4}\) (superseded) |
\({\cal{B}} ( \bar{B}^0 \to \Sigma_c^0 \bar{p} \pi^+ )\) | \(1.59 \times 10^{-4}\) (superseded) |
\({\cal{B}} ( \bar{B}^0 \to \Sigma_c^{*0} \bar{p} \pi^+ )\) | \(1.21 \times 10^{-4}\) (superseded) |
\({\cal{B}} ( B^- \to \Sigma_c^0 \bar{p} )\) | \([0.45 ^{+0.26}_{-0.19}\mbox{ (stat)} \pm 0.07\mbox{ (syst)} \pm 0.12\mbox{ (Lambdac+ BF)}] \times 10^{-4}\) |
\({\cal{B}} ( B^- \to \Sigma_c^{*0} \bar{p} )\) | \(0.46 \times 10^{-4}\) |