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The mass, coupling and width of the newly observed charged resonance $ Z_{c}^{-}(4100)$ are calculated by treating it as a scalar four-quark system with a diquark-antidiquark structure. The mass and coupling of the state $ Z_{c}^{-}(4100)$ are calculated using the QCD two-point sum rules. In these calculations we take into account contributions of the quark, gluon and mixed condensates up to dimension ten. The spectroscopic parameters of $ Z_{c}^{-}(4100)$ obtained by this way are employed to study its $S$-wave decays to $\eta_c(1S)\pi^{-}$, $\eta_c(2S)\pi^{-}$ and $J/\psi \rho ^{-}$ final states. To this end, we evaluate the strong coupling constants $g_{Z_c\eta_{c1} \pi}$, $g_{Z_{c}\eta_{c2} \pi}$ and $g_{Z_{c}J/\psi \rho }$ corresponding to the vertices $Z_{c}^{-}(4100)\eta_c(1S)\pi^{-}$, $Z_{c}^{-}(4100)\eta_c(2S) \pi^{-}$ and $Z_{c}^{-}(4100)J/\psi \rho^{-}$, respectively. The first two couplings are computed by means of the QCD three-point sum rule method, whereas $g_{Z_{c}J/\psi \rho }$ is obtained from the QCD light-cone sum rule approach and soft-meson approximation. Obtained result for the mass $m=(4080 \pm 150)~\mathrm{MeV}$ of the resonance $Z_{c}^{-}(4100)$ is in excellent agreement with the LHCb data. The prediction for its total width $\Gamma =(128 \pm 19)~\mathrm{MeV}$ is compatible with the data within the errors.
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