In this section, we present the experiments on the methodology for the dummy {\thething} selection presented in Section~\ref{subsec:lmdk-sel-sol}, on the real and synthetic data sets.
Due to the high complexity of the \texttt{Optimal} and \texttt{Heuristic} algorithms, we choose to evaluate only the \texttt{Partitioned}, which is the optimized solution that we designed.
With the experiments on the synthetic data sets (Section~\ref{subsec:sel-utl}) we show the normalized Euclidean and Wasserstein distance metrics (not to be confused with the temporal distances in Figure~\ref{fig:avg-dist})
% \kat{is this distance the landmark distance that we saw just before ? clarify }
of the time series histograms for various distributions and {\thething} percentages.
With the experiments on the real data sets (Section~\ref{subsec:sel-prv}), we show the performance in terms of utility of our three {\thething} schemes in combination with the privacy-preserving dummy {\thething} selection module, which enhances the privacy protection that our concept provides.
Figure~\ref{fig:sel-dist} demonstrates the normalized distance that we obtain when we utilize either (a)~the Euclidean or (b)~the Wasserstein distance metric to obtain a set of {\thethings} including regular events.
\caption{The normalized (a)~Euclidean, and (b)~Wasserstein distance of the generated {\thething} sets for different {\thething} percentages.}
\label{fig:sel-dist}
\end{figure}
Comparing the results of the Euclidean distance in Figure~\ref{fig:sel-dist-norm} with those of the Wasserstein in Figure~\ref{fig:sel-dist-emd} we conclude that the Euclidean distance provides more consistent results for all possible distributions.
The maximum difference per {\thething} percentage is approximately $0.2$ for the former and $0.15$ for the latter between the bimodal and skewed {\thething} distributions.
Overall, the Euclidean distance achieves a mean normalized distance of $0.3$, while the Wasserstein distance a mean normalized distance that is equal to $0.2$.
Therefore, and by observing Figure~\ref{fig:sel-dist}, Wasserstein demonstrates a less consistent performance and less linear behavior among all possible {\thething} distributions.
Thus, we choose to utilize the Euclidean distance metric for the implementation of the privacy-preserving dummy {\thething} selection module in Section~\ref{subsec:lmdk-sel-sol}.
In Figure~\ref{fig:sel-eps}, we test the \texttt{Uniform} mechanism with real data by investing different ratios ($1$\%, $10$\%, $25$\%, and $50$\%) of the available privacy budget $\varepsilon$ in the dummy {\thething} selection module and the remaining in perturbing the original data values, in order to figure out the optimal ratio value.
In general, we are expecting to observe that greater ratios will result in more accurate, i.e.,~smaller, {\thething} sets and less accurate values in the released data.
\caption{The mean absolute error (a)~as a percentage, (b)~in kWh, and (c)~in meters of the released data for different {\thething} percentages. We apply the \texttt{Uniform}{\thething} privacy mechanism and vary the ratio of the privacy budget $\varepsilon$ that we allocate to the dummy {\thething} selection module.}
The application of the randomized response mechanism, in the Copenhagen data set (Figure~\ref{fig:copenhagen-sel-eps}), is tolerant to the fluctuations of the privacy budget and maintains a relatively constant performance in terms of data utility.
For HUE (Figure~\ref{fig:hue-sel-eps}) and T-drive (Figure~\ref{fig:t-drive-sel-eps}), we observe that our implementation performs better for lower ratios, e.g.,~$0.01$, where we end up allocating the majority of the available privacy budget to the data release process instead of the dummy {\thething} selection module.
The results of this experiment indicate that we can safely allocate the majority of $\varepsilon$ to the data publishing process, and therefore achieve better data utility, while guaranteeing more robust privacy protection.
Figure~\ref{fig:real-sel} exhibits the performance of \texttt{Skip}, \texttt{Uniform}, and \texttt{Adaptive} schemes (presented in detail in Section~\ref{subsec:lmdk-mechs}) in combination with the {\thething} selection module (Section~\ref{subsec:lmdk-sel-sol}).
The mean absolute error (a)~as a percentage, (b)~in kWh, and (c)~in meters of the released data, for different {\thething} percentages from Figure~\ref{fig:real}.
The markers indicate the corresponding measurements with the incorporation of the privacy-preserving {\thething} selection module.
In comparison with the utility performance without the dummy {\thething} selection module (solid bars), we notice a slight deterioration for all three schemes (markers).
This is natural since we allocated part of the available privacy budget to the privacy-preserving dummy {\thething} selection module, which in turn increased the number of {\thethings}, except for the case of $100$\%{\thethings}.
\texttt{Skip} performs best in our experiments with HUE (Figure~\ref{fig:hue-sel}), due to the low range in the energy consumption and the high scale of the Laplace noise that it avoids due to the employed approximation.
However, for the Copenhagen data set (Figure~\ref{fig:copenhagen-sel}) and T-drive (Figure~\ref{fig:t-drive-sel}), \texttt{Skip} attains high mean absolute error, which exposes no benefit with respect to user-level protection.
Overall, \texttt{Adaptive} has a consistent performance in terms of utility for all of the data sets that we experimented with, and almost always outperforms the user-level privacy protection.
Thus, \texttt{Adaptive} is selected as the best scheme to use in general.