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author | Vasil Zlatanov <v@skozl.com> | 2018-12-13 17:07:18 +0000 |
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committer | Vasil Zlatanov <v@skozl.com> | 2018-12-13 17:07:18 +0000 |
commit | a015ffd16b2834e522ad3d3b0e2b9c6160d65044 (patch) | |
tree | ca8a195ff303eaf4e728db178f2533e8864edbaa /report | |
parent | a0ae3fb1c5b31de867dbd00f50744500306d03bc (diff) | |
download | vz215_np1915-a015ffd16b2834e522ad3d3b0e2b9c6160d65044.tar.gz vz215_np1915-a015ffd16b2834e522ad3d3b0e2b9c6160d65044.tar.bz2 vz215_np1915-a015ffd16b2834e522ad3d3b0e2b9c6160d65044.zip |
Add optimisation and begin desc in eval
Diffstat (limited to 'report')
-rwxr-xr-x | report/paper.md | 7 |
1 files changed, 5 insertions, 2 deletions
diff --git a/report/paper.md b/report/paper.md index 0aa514a..89e260c 100755 --- a/report/paper.md +++ b/report/paper.md @@ -193,12 +193,13 @@ be defined as $k_1$: $R^*(g_i,k_1)$. The distances obtained are then mixed, obtaining a final distance $d^*(p,g_i)$ that is used to obtain the improved rank-list: $d^*(p,g_i)=(1-\lambda)d_J(p,g_i)+\lambda d(p,g_i)$. +## Optimisation The aim is to learn optimal values for $k_1,k_2$ and $\lambda$ in the training set that improve top1 identification accuracy. This is done through a simple multi-direction search algorithm followed by exhaustive search to estimate $k_{1_{opt}}$ and $k_{2_{opt}}$ for eleven values of $\lambda$ from zero (only Jaccard distance) to one (only original distance) in steps of 0.1. The results obtained through this approach suggest: $k_{1_{opt}}=9, k_{2_{opt}}=3, 0.1\leq\lambda_{opt}\leq 0.3$. -It is possible to verify that the optimization of $k_{1_{opt}}$, $k_{2_{opt}}$ and $\lambda$ +It is possible to verify that the optimisation of $k_{1_{opt}}$, $k_{2_{opt}}$ and $\lambda$ has been successful. Figures \ref{fig:pqvals} and \ref{fig:lambda} show that the optimal values obtained from training are close to the ones for the local maximum of gallery and query. @@ -220,7 +221,6 @@ training are close to the ones for the local maximum of gallery and query. \end{center} \end{figure} - ## $k$-reciprocal Re-ranking Evaluation Re-ranking achieves better results than the other baseline methods analyzed both as top $k$ @@ -252,6 +252,9 @@ The difference between the top $k$ accuracies of the two methods gets smaller as \end{center} \end{figure} +The improved results due to $k$-reciprocal re-ranking can be explained by considering...re-ranking can be explained by considering... + + # Conclusion # References |