Single-Holed Regions: Their Relations and Inferences

Vasardani, Maria; Egenhofer, Max J.

doi:10.1007/978-3-540-87473-7_22

Maria Vasardani¹ &
Max J. Egenhofer¹

Part of the book series: Lecture Notes in Computer Science ((LNISA,volume 5266))

Included in the following conference series:

International Conference on Geographic Information Science

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Abstract

The discontinuities in boundaries and exteriors that regions with holes expose offer opportunities for inferences that are impossible for regions without holes. A systematic study of the binary relations between single-holed regions shows not only an increase in the number of feasible relations (from eight between two regions without holes to 152 for two single-holed regions), but also identifies the increased reasoning power enabled by the holes. A set of quantitative measures is introduced to compare various composition tables over regions with and without holes. These measures reveal that inferences over relations for holed regions are overall crisper and yield more unique results than relations over regions without holes. Likewise, compositions that involve more holed regions than regions without holes provide crisper inferences, which supports the need for relation models that capture holes explicitly.

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References

Ahmed, N., Kanhere, S., Jha, S.: The Holes Problem in Wireless Sensor Networks: A Survey. Mobile Computing and Communications Review 9(2), 4–18 (2005)
Article Google Scholar
Cassati, R., Varzi, A.: Holes and Other Superficialities. MIT Press, Cambridge (1994)
Google Scholar
Cohn, A., Gotts, N.: The ‘Egg-Yolk’ Representation of Regions with Indeterminate Boundaries. In: Burrough, P., Frank, A. (eds.) Geographic Objects with Indeterminate Boundaries, pp. 171–187. Taylor & Francis, Bristol (1996)
Google Scholar
Clementini, E., Di Felice, P.: An Algebraic Model for Spatial Objects with Indeterminate Boundaries. In: Burrough, P., Frank, A. (eds.) Geographic Objects with Indeterminate Boundaries, pp. 155–170. Taylor & Francis, Bristol (1996)
Google Scholar
Egenhofer, M.: Deriving the Composition of Binary Topological Relations. Journal of Visual Languages and Computing 5(1), 133–149 (1994)
Article Google Scholar
Egenhofer, M., Clementini, E., Di Felice, P.: Topological Relations Between Regions With Holes. International Journal of Geographical Information Systems 8(2), 129–144 (1994)
Article Google Scholar
Egenhofer, M., Franzosa, R.: Point-Set Topological Spatial Relations. International Journal of Geographical Information Systems 5(2), 161–174 (1991)
Article Google Scholar
Egenhofer, M., Herring, J.: 1994, Categorizing Binary Topological Relations Between Regions, Lines, and Points in Geographic Databases. Technical Report, Department of Surveying Engineering, University of Maine (1990)
Google Scholar
Egenhofer, M., Vasardani, M.: Spatial Reasoning with a Hole. In: Winter, S., Duckham, M., Kulik, L., Kuipers, B. (eds.) COSIT 2007. LNCS, vol. 4736, pp. 303–320. Springer, Heidelberg (2007)
Chapter Google Scholar
Lewis, D., Lewis, S.: Holes. Australasian Journal of Philosophy 48, 206–212 (1970)
Article Google Scholar
Li, S., Ying, M.: Region Connection Calculus: Its Models and Composition Table. Artificial Intelligence 145(1-2), 121–146 (2003)
Article MATH MathSciNet Google Scholar
Mackworth, A.: Consistency in Networks of Relations. Artificial Intelligence 8(1), 99–118 (1977)
Article MATH MathSciNet Google Scholar
Papadias, D., Theodoridis, Y., Selis, T., Egenhofer, M.: Topological Relations in the World of Minimum Bounding Rectangles: A Study with R-trees. SIGMOD Record 24(2), 92–103 (1995)
Article Google Scholar
Randell, D., Cohn, A., Cui, Z.: A Spatial Logic Based on Regions and Connection. In: Proceedings of the 3rd International Conference on Knowledge Representation and Reasoning, pp. 165–176. Morgan Kaufmann, San Mateo (1992)
Google Scholar
Schneider, M., Behr, T.: Topological Relationships between Complex Spatial Objects. ACM Transactions on Database Systems 31(1), 39–81 (2006)
Article Google Scholar
Stefanidis, A., Nittel, S.: Geosensor Networks. CRC Press, Boca Raton (2004)
Google Scholar
Varzi, A.: Reasoning about Space: The Hole Story. Logic and Logical Philosophy 4, 3–39 (1996)
MATH MathSciNet Google Scholar

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Authors and Affiliations

National Center for Geographic Information and Analysis and Department of Spatial Information Science and Engineering, University of Maine, Boardman Hall, Orono, ME 04469-5711, USA
Maria Vasardani & Max J. Egenhofer

Authors

Maria Vasardani
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Max J. Egenhofer
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Thomas J. Cova Harvey J. Miller Kate Beard Andrew U. Frank Michael F. Goodchild

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Vasardani, M., Egenhofer, M.J. (2008). Single-Holed Regions: Their Relations and Inferences. In: Cova, T.J., Miller, H.J., Beard, K., Frank, A.U., Goodchild, M.F. (eds) Geographic Information Science. GIScience 2008. Lecture Notes in Computer Science, vol 5266. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-540-87473-7_22

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DOI: https://doi.org/10.1007/978-3-540-87473-7_22
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-87472-0
Online ISBN: 978-3-540-87473-7
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