Constrained Shortest Path Computation
This paper proposes and solves a-autonomy and k-stops shortest path problems in large spatial databases. Given a source s and a destination d, an aautonomy query retrieves a sequence of data points connecting s and d, such that the distance between any two consecutive points in the path is not great...
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2005
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sg-smu-ink.sis_research-18822016-04-29T07:58:18Z Constrained Shortest Path Computation TERROVITIS, Manolis BAKIRAS, Spiridon PAPADIAS, Dimitris MOURATIDIS, Kyriakos This paper proposes and solves a-autonomy and k-stops shortest path problems in large spatial databases. Given a source s and a destination d, an aautonomy query retrieves a sequence of data points connecting s and d, such that the distance between any two consecutive points in the path is not greater than a. A k-stops query retrieves a sequence that contains exactly k intermediate data points. In both cases our aim is to compute the shortest path subject to these constraints. Assuming that the dataset is indexed by a data-partitioning method, the proposed techniques initially compute a sub-optimal path by utilizing the Euclidean distance information provided by the index. The length of the retrieved path is used to prune the search space, filtering out large parts of the input dataset. In a final step, the optimal (a-autonomy or k-stops) path is computed (using only the non-eliminated data points) by an exact algorithm. We discuss several processing methods for both problems, and evaluate their efficiency through extensive experiments. 2005-08-01T07:00:00Z text application/pdf https://ink.library.smu.edu.sg/sis_research/883 info:doi/10.1007/11535331_11 https://ink.library.smu.edu.sg/context/sis_research/article/1882/viewcontent/SSTD05_CSP.pdf http://creativecommons.org/licenses/by-nc-nd/4.0/ Research Collection School Of Computing and Information Systems eng Institutional Knowledge at Singapore Management University Databases and Information Systems Numerical Analysis and Scientific Computing |
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Databases and Information Systems Numerical Analysis and Scientific Computing TERROVITIS, Manolis BAKIRAS, Spiridon PAPADIAS, Dimitris MOURATIDIS, Kyriakos Constrained Shortest Path Computation |
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This paper proposes and solves a-autonomy and k-stops shortest path problems in large spatial databases. Given a source s and a destination d, an aautonomy query retrieves a sequence of data points connecting s and d, such that the distance between any two consecutive points in the path is not greater than a. A k-stops query retrieves a sequence that contains exactly k intermediate data points. In both cases our aim is to compute the shortest path subject to these constraints. Assuming that the dataset is indexed by a data-partitioning method, the proposed techniques initially compute a sub-optimal path by utilizing the Euclidean distance information provided by the index. The length of the retrieved path is used to prune the search space, filtering out large parts of the input dataset. In a final step, the optimal (a-autonomy or k-stops) path is computed (using only the non-eliminated data points) by an exact algorithm. We discuss several processing methods for both problems, and evaluate their efficiency through extensive experiments. |
| format |
text |
| author |
TERROVITIS, Manolis BAKIRAS, Spiridon PAPADIAS, Dimitris MOURATIDIS, Kyriakos |
| author_facet |
TERROVITIS, Manolis BAKIRAS, Spiridon PAPADIAS, Dimitris MOURATIDIS, Kyriakos |
| author_sort |
TERROVITIS, Manolis |
| title |
Constrained Shortest Path Computation |
| title_short |
Constrained Shortest Path Computation |
| title_full |
Constrained Shortest Path Computation |
| title_fullStr |
Constrained Shortest Path Computation |
| title_full_unstemmed |
Constrained Shortest Path Computation |
| title_sort |
constrained shortest path computation |
| publisher |
Institutional Knowledge at Singapore Management University |
| publishDate |
2005 |
| url |
https://ink.library.smu.edu.sg/sis_research/883 https://ink.library.smu.edu.sg/context/sis_research/article/1882/viewcontent/SSTD05_CSP.pdf |
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