Measurement of $CP$ asymmetry in $D^0 \rightarrow K^- K^+$ and $D^0 \rightarrow Ï^- Ï^+$ decays
arXiv:1405.2797 · doi:10.1007/JHEP07(2014)041
Abstract
Time-integrated $CP$ asymmetries in $D^0$ decays to the final states $K^- K^+$ and $Ï^- Ï^+$ are measured using proton-proton collisions corresponding to $3\mathrm{\,fb}^{-1}$ of integrated luminosity collected at centre-of-mass energies of $7\mathrm{\,Te\kern -0.1em V}$ and $8\mathrm{\,Te\kern -0.1em V}$. The $D^0$ mesons are produced in semileptonic $b$-hadron decays, where the charge of the accompanying muon is used to determine the initial flavour of the charm meson. The difference in $CP$ asymmetries between the two final states is measured to be \begin{align} ÎA_{CP} = A_{CP}(K^-K^+)-A_{CP}(Ï^-Ï^+) = (+0.14 \pm 0.16\mathrm{\,(stat)} \pm 0.08\mathrm{\,(syst)})\% \ . \nonumber \end{align} A measurement of $A_{CP}(K^-K^+)$ is obtained assuming negligible $CP$ violation in charm mixing and in Cabibbo-favoured $D$ decays. It is found to be \begin{align} A_{CP}(K^-K^+) = (-0.06 \pm 0.15\mathrm{\,(stat)} \pm 0.10\mathrm{\,(syst)}) \% \ ,\nonumber \end{align} where the correlation coefficient between $ÎA_{CP}$ and $A_{CP}(K^-K^+)$ is $Ï=0.28$. By combining these results, the $CP$ asymmetry in the $D^0\rightarrowÏ^-Ï^+$ channel is $A_{CP}(Ï^-Ï^+)=(-0.20\pm0.19\mathrm{\,(stat)}\pm0.10\mathrm{\,(syst)})\%$.
19 pages, 5 figures