Prospective analysis of CKM element $|V_{cd}|$ and $D^+$-meson decay constant from leptonic decays $D^+ \to \ell^+ ν$

Abstract: The leptonic decay of $D^+$-meson has attracted significant interest due to its unique characteristics. In this paper, we carry out an investigation into the $D^+$-meson leptonic decays $D^+\to \ell^+\nu_{\ell}$ with $\ell=(e,\mu,\tau)$ by employing the QCD sum rules approach. In which the $D^+$-meson decay constant $f_{D^+}$ is an important input parameter in the process. To enhance the accuracy of our calculations for $f_{D^+}$, we consider the quark propagator and vertex up to dimension-six within the framework of background field theory. Consequently, we obtain the QCD sum rule expression for $f_{D^+}$ up to dimension-six condensates, yielding $f_{D^+}=203.0\pm1.5~\mathrm{MeV}$. Our results are in good agreement with BESIII measurements and theoretical predictions. We also present the integrated decay widths for the $D^+$-meson in three channels $\Gamma(D^+\to e^+\nu_e)=(5.263_{-0.075}^{+0.076})\times10^{-21}~\mathrm{GeV}$, $\Gamma(D^+\to \mu^+\nu_{\mu})=(2.236_{-0.032}^{+0.032})\times10^{-16}~\mathrm{GeV}$ and $\Gamma(D^+\to \tau^+\nu_{\tau})=(5.958_{-0.085}^{+0.086})\times10^{-16}~\mathrm{GeV}$. Accordingly, we compute the branching fraction $\mathcal{B}(D^+\to\ell^+\nu_{\ell})$ with the electron, muon and tau channels, which are $\mathcal{B}(D^+\to e^+\nu_e)=(8.260_{-0.118}^{+0.119})\times10^{-9}$, $\mathcal{B}(D^+\to\mu^+\nu_{\mu})=(3.508_{-0.050}^{+0.051})\times10^{-4}$ and $\mathcal{B}(D^+\to\tau^+\nu_{\tau})=(0.935_{-0.013}^{+0.013})\times10^{-3}$. Furthermore, we present our prediction for the CKM matrix element $|V_{cd}|$ using the branching fraction $\mathcal{B}(D^+\to\mu^+\nu_{\mu})$ obtained from BESIII Collaboration, yielding $|V_{cd}|=0.227_{-0.001}^{+0.002}$.