Belle: INSPIRE
Comment: Used BR( Y(4S) -> B0 B0bar ) / BR( Y(4S) -> B+ B- ) = 1 with 8% uncertainty
Parameter | Measurement |
---|---|
\(\frac{{\cal{B}} ( B^- \to J/\psi(1S) K_1^-(1270) )}{{\cal{B}} ( B^- \to J/\psi(1S) K^- )}\) | \([1.80 \pm 0.34\mbox{ (stat)} \pm 0.34\mbox{ (syst)}]\) |
\(\frac{{\cal{B}} ( B^- \to J/\psi(1S) K_1^-(1400) )}{{\cal{B}} ( B^- \to J/\psi(1S) K_1^-(1270) )}\) | \(0.30\) |
\(\frac{{\cal{B}} ( \bar{B}^0 \to J/\psi(1S) \bar{K}_1^0(1270) )}{{\cal{B}} ( B^- \to J/\psi(1S) K^- )}\) | \([1.30 \pm 0.34\mbox{ (stat)} \pm 0.28\mbox{ (syst)}]\) |
\({\cal{B}} ( B^- \to J/\psi(1S) K_1^-(1270) )\) | \([1.80 \pm 0.34\mbox{ (stat)} \pm 0.30\mbox{ (syst)} \pm 0.25\mbox{ (k(1270) br (correlated))}] \times 10^{-3}\) |
\({\cal{B}} ( \bar{B}^0 \to J/\psi(1S) \bar{K}_1^0(1270) )\) | \([1.30 \pm 0.34\mbox{ (stat)} \pm 0.25\mbox{ (syst)} \pm 0.18\mbox{ (k(1270) br (correlated))}] \times 10^{-3}\) |