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@@ -337,13 +337,15 @@ The band of protons is then extracted by cut on likelihood probability
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calculated as:
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\begin{equation}
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p_{i} = \dfrac{1}{\sqrt{2\pi}\sigma_{\Delta E}}
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e^{\frac{(\Delta E_{meas.} - \Delta E_i)^2} {2\sigma^2_{\Delta E}}}
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\exp{\left[\dfrac{(\Delta E_{meas.} - \Delta E_i)^2} {2\sigma^2_{\Delta
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E}}\right]}
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\end{equation}
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where $\Delta E_{\textrm{meas.}}$ is measured energy deposition in the thin
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where $\Delta E_{\textrm{meas.}}$ is energy deposition measured by the thin
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silicon detector by a certain proton at energy $E_i$, $\Delta E_i$ and
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$\sigma_{\Delta E}$ are the expected and standard deviation of the energy loss
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caused by the proton calculated by MC. A cut value of $3\sigma_{\Delta E}$, or
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$p_i \ge 0.011$, was used to extract protons (\cref{fig:al100_protons}).
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caused by the proton calculated by MC study. A threshold is set to extract
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protons at 0.011 (equivalent to $3\sigma_{\Delta E}$), the band of protons is
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shown in (\cref{fig:al100_protons}).
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\begin{figure}[htb]
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\centering
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\includegraphics[width=0.47\textwidth]{figs/al100_protons}
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@@ -354,6 +356,12 @@ $p_i \ge 0.011$, was used to extract protons (\cref{fig:al100_protons}).
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\label{fig:al100_protons}
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\end{figure}
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The cut efficiency in the energy range from \SIrange{2}{12}{\MeV} is estimated
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by MC study. The fraction of protons that do not satisfy the probability cut
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is 0.5\%. The number of other charged particles that are misidentified as
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protons depends on the ratios between those species and protons. Assuming
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a proton:deuteron:triton:alpha:muon ratio of 5:2:1:2:2, the number of
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misidentified hits is 0.1\% of the number of protons.
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%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
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\section{Proton emission rate from aluminium}
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\label{sec:proton_emission_rate_from_aluminium}
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@@ -365,25 +373,20 @@ of protons is normalised to the number of nuclear muon captures.
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\subsection{Number of protons emitted}
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\label{sub:number_of_protons_emitted}
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From the particle identification above, number of protons having energy in the
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range from \SIrange{2.2}{8.5}{\MeV} hitting the two arms are:
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The numbers of protons in the energy range from \SIrange{2.2}{8.5}{\MeV} after
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applying the probability cut are:
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\begin{align}
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N_{\textrm{p meas. left}} = 1822 \pm 42.7\\
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N_{\textrm{p meas. right}} = 2373 \pm 48.7
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N_{\textrm{p meas. left}} = 1822\\% \pm 42.7\\
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N_{\textrm{p meas. right}} = 2373% \pm 48.7
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\end{align}
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The right arm received significantly more protons than the left arm did, which
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is expected as in \cref{sub:momentum_scan_for_the_100_} it is shown that
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muons stopped off centre to the right arm.
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%%TODO
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The uncertainties are statistical only. The systematic uncertainties due to
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the cut on protons is estimated to be small compared to the statistical ones.
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is expected as in \cref{sub:momentum_scan_for_the_100_} where it is shown that
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muons stopped off-centred to the right arm.
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\subsection{Corrections for the number of protons}
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\label{sub:corrections_for_the_number_of_protons}
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The protons spectra observed by the silicon detectors have been modified by
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the energy loss inside the target so correction (also called unfolding, or
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reconstruction) is necessary.
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the energy loss inside the target so correction (or unfolding) is necessary.
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The unfolding, essentially, is finding a response function that relates proton's
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true energy and measured value. This can be done in MC simulation by generating
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protons with a spatial distribution as close as possible to the real
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@@ -413,28 +416,65 @@ method is implemented.
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\caption{Response functions for the two silicon arms.}
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\label{fig:al100_resp_matrices}
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\end{figure}
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After training the unfolding code is applied on the measured spectra from the
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left and right arms. The unfolded proton spectra in \cref{fig:al100_unfold}
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reasonably reflect the distribution of initial protons which is off-centred to
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the right arm. The path length to the left arm is longer so less protons at
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energy lower than \SI{5}{\MeV} could reach the detectors. The sharp low-energy
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cut off on the right arm is consistent with the Coulomb barrier for protons,
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which is \SI{4.1}{\MeV} for protons emitted from $^{27}$Mg.
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%After training, the unfolding code is applied on the measured spectra from the
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%left and right arms. The unfolded proton spectra in \cref{fig:al100_unfold}
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%reasonably reflect the distribution of initial protons which is off-centred to
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%the right arm. The path length to the left arm is longer so less protons at
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%energy lower than \SI{5}{\MeV} could reach the detectors. The sharp low-energy
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%cut off on the right arm is consistent with the Coulomb barrier for protons,
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%which is \SI{4.1}{\MeV} for protons emitted from $^{27}$Mg.
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The unfolded spectra using the two observed spectra at the two arms as input
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are shown in \cref{fig:al100_unfold}. The two unfolded spectra generally agree
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with each other, except for a few first and last bins. The discrepancy and
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large uncertainties at the low energy region are because of only a small
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number of protons with those energies could reach the detectors. The jump on
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the right arm at around \SI{9}{\MeV} can be explained as the punch-through
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protons were counted as the proton veto counters were not used in this
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analysis.
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Comparing the reconstructed spectra from \SIrange{5}{8}{\MeV}, the protons
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yields are consistent with each other:
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%Several studies were conducted to assess the performance of the unfolding
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%code, including:
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%\begin{itemize}
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%\item stability against cut-off energy;
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%\item comparison between the two arms;
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%\item and unfolding of a MC-generated spectrum.
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%\end{itemize}
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The stability of the unfolding code is tested by varying the lower cut-off
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energy of the input spectrum. \cref{fig:al100_cutoff_study} show that the
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shapes of the unfolded spectra are stable. The lower cut-off energy of the
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output increases as that of the input increases, and the shape is generally
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unchanged after a few bins.
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\begin{figure}[htb]
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\centering
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\includegraphics[width=0.85\textwidth]{figs/al100_cutoff_study}
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\caption{Unfolded spectra with different cut-off energies.}
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\label{fig:al100_cutoff_study}
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\end{figure}
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The proton yields calculated from observed spectra in two arms are compared in
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\cref{fig:al100_integral_comparison} where the upper limit of the integrals
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is fixed at \SI{8}{\MeV}, and the lower limit is varied in \SI{400}{\keV} step.
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The difference is large at cut-off energies less than \SI{4}{\MeV} due to
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large uncertainties at the first bins. Above \SI{4}{\MeV}, the two arms show
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consistent numbers of protons.
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\begin{figure}[htb]
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\centering
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\includegraphics[width=0.85\textwidth]{figs/al100_integral_comparison}
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\caption{Proton yields calculated from two arms.}
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\label{fig:al100_integral_comparison}
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\end{figure}
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The yields of protons from \SIrange{4}{8}{\MeV} are:
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\begin{align}
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N_{\textrm{p reco. left}} &= (110.9 \pm 2.0)\times 10^3\\
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N_{\textrm{p reco. right}} &= (110.2 \pm 2.3)\times 10^3
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N_{\textrm{p unfold left}} &= (165.4 \pm 2.7)\times 10^3\\
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N_{\textrm{p unfold right}} &= (173.1 \pm 2.9)\times 10^3
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\end{align}
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Therefore, the number of emitted protons is taken as average value:
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\begin{equation}
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N_{\textrm{p reco.}} = (110.6 \pm 2.2) \times 10^3
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N_{\textrm{p unfold}} = (169.3 \pm 2.9) \times 10^3
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\end{equation}
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\begin{figure}[htb]
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\centering
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\includegraphics[width=0.85\textwidth]{figs/al100_unfold}
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\includegraphics[width=0.85\textwidth]{figs/al100_unfolded_lr}
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\caption{Unfolded proton spectra from the 100-\si{\um} aluminium target.}
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\label{fig:al100_unfold}
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\end{figure}
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@@ -458,29 +498,84 @@ the number of nuclear captures are:
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N_{\mu \textrm{ stopped}} &= (1.57 \pm 0.05)\times 10^7\\
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N_{\mu \textrm{ nucl. cap.}} &= (9.57\pm 0.31)\times 10^6
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\end{align}
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The proton emission rate in the range from \SIrange{5}{8}{\MeV} is therefore:
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\subsection{Proton emission rate}
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\label{sub:proton_emission_rate}
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The proton emission rate in the range from \SIrange{4}{8}{\MeV} is therefore:
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\begin{equation}
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R_{\textrm{p}} = \frac{110.6\times 10^3}{9.57\times 10^6} = 1.16\times
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R_{\textrm{p}} = \frac{169.3\times 10^3}{9.57\times 10^6} = 1.74\times
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10^{-2}
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\label{eq:proton_rate_al}
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\end{equation}
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%\subsection{Uncertainties of the emission rate}
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%\label{sub:uncertainties_of_the_emission_rate}
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%The uncertainties of the emission rate come from:
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%\begin{itemize}
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%\item uncertainties in the number of protons:
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%\begin{itemize}
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%\item statistical uncertainty of the measured spectra;
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%\item systematic uncertainty due to misidentification;
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%\item systematic uncertainty from the unfolding
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%\end{itemize}
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%\item uncertainties in the number of nuclear captures:
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%\begin{itemize}
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%\item statistical uncertainty of the number of X-rays;
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%\item uncertainty of the detector acceptance;
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%\item uncertainty from the corrections: random summing and transistor
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%reset amplifier
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%\end{itemize}
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%\end{itemize}
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The total proton emission rate can be estimated by assuming a spectrum shape
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with the same parameterisation as in \eqref{eqn:EH_pdf}. The fit parameters
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are shown in . With such parameterisation, the integration in
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range from \SIrange{4}{8}{\MeV} is 51\% of the total number of protons. The
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total proton emission rate is therefore $3.5\times 10^{-2}$.
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\subsection{Uncertainties of the emission rate}
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\label{sub:uncertainties_of_the_emission_rate}
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The uncertainties of the emission rate come from:
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\begin{itemize}
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\item uncertainties in the number of nuclear captures: these were discussed
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in \cref{sub:number_of_stopped_muons_from_the_number_of_x_rays};
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\item uncertainties in the number of protons:
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\begin{itemize}
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\item statistical uncertainties of the measured spectra which are
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propagated during the unfolding process;
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\item systematic uncertainties due to misidentification: this number is
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small compared to other uncertainties as discussed in
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\cref{sub:event_selection_for_the_passive_targets};
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\item systematic uncertainty from the unfolding
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\end{itemize}
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\end{itemize}
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The last item is studied by MC method using the parameterisation in
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\cref{sub:proton_emission_rate}:
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\begin{itemize}
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\item protons with energy distribution obeying the parameterisation are
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generated inside the target. The spatial distribution is the same as that
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of in \cref{sub:corrections_for_the_number_of_protons}. MC truth including
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initial energies and positions are recorded;
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\item the number of protons reaching the silicon detectors are counted,
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the proton yield is set to be the same as the measured yield to make the
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statistical uncertainties comparable;
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\item the unfolding is applied on the observed proton spectra, and the
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results are compared with the MC truth.
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\end{itemize}
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\begin{figure}[htb]
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\centering
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\includegraphics[width=0.48\textwidth]{figs/al100_MCvsUnfold}
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\includegraphics[width=0.48\textwidth]{figs/al100_unfold_truth_ratio}
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\caption{Comparison between an unfolded spectrum and MC truth: spectra
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(left), and yields (right). The ratio is defined as $\textrm{(Unfold - MC
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truth)/(MC truth)}$}
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\label{fig:al100_MCvsUnfold}
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\end{figure}
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\Cref{fig:al100_MCvsUnfold} shows that the yield obtained after unfolding is
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in agreement with that from the MC truth. The difference is less than 5\% if
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the integration is taken in the range from \SIrange{4}{8}{\MeV}. Therefore
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a systematic uncertainty of 5\% is assigned for the unfolding routine.
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A summary of uncertainties in the measurement of proton emission rate is
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presented in \cref{tab:al100_uncertainties_all}.
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\begin{table}[htb]
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\begin{center}
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\begin{tabular}{@{}ll@{}}
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\toprule
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\textbf{Item}& \textbf{Value} \\
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\midrule
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Number of muons & 3.2\% \\
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Statistical from measured spectra & 1.6\% \\
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Systematic from unfolding & 5.0\% \\
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Systematic from PID & \textless0.5\% \\
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\midrule
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Total & 6.1\%\\
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\bottomrule
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\end{tabular}
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\end{center}
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\caption{Uncertainties of the proton emission rate.}
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\label{tab:al100_uncertainties_all}
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\end{table}
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The proton emission rate is then $(3.5 \pm 0.2)$\%.
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