Study of $J/Ï$ and $Ï(3686)$ decays to $Ï^+Ï^-η^\prime$
arXiv:1709.00018 · doi:10.1103/PhysRevD.96.112012
Abstract
Using the data samples of $1.31\times 10^9$ $J/Ï$ events and $4.48\times 10^8$ $Ï(3686)$ events collected with the BESIII detector, partial wave analyses on the decays $J/Ï$ and $Ï(3686) \to Ï^+Ï^-η^\prime$ are performed with a relativistic covariant tensor amplitude approach. The dominant contribution is found to be $J/Ï$ and $Ï(3686)$ decays to $Ïη^\prime$. In the $J/Ï$ decay, the branching fraction ${\cal B}(J/Ï\to Ïη^\prime)$ is determined to be $(7.90\pm0.19(\mathrm{stat})\pm0.49(\mathrm{sys}))\times 10^{-5}$. Two solutions are found in the $Ï(3686)$ decay, and the corresponding branching fraction ${\cal B}(Ï(3686)\to Ïη^\prime)$ is $(1.02\pm0.11(\mathrm{stat})\pm0.24(\mathrm{sys}))\times 10^{-5}$ for the case of constructive interference, and $(5.69\pm1.28(\mathrm{stat})\pm2.36(\mathrm{sys}))\times 10^{-6}$ for destructive interference. As a consequence, the ratios of branching fractions between $Ï(3686)$ and $J/Ï$ decays to $Ïη^\prime$ are calculated to be $(12.9\pm1.4(\mathrm{stat})\pm3.1(\mathrm{sys}))$\% and $(7.2\pm1.6(\mathrm{stat})\pm3.0(\mathrm{sys}))$\%, respectively. We also determine the inclusive branching fractions of $J/Ï$ and $Ï(3686)$ decays to $Ï^+Ï^-η^\prime$ to be $(1.36\pm0.02(\mathrm{stat})\pm0.08(\mathrm{sys}))\times 10^{-4}$ and $(1.51\pm0.14(\mathrm{stat})\pm 0.23(\mathrm{sys}))\times 10^{-5}$, respectively.
13 pages, 5 figures, 6 tables