Abstract
Conceptual neighborhood diagram is a network diagram that schematizes a set of spatial/temporal relations. This paper proposes a strategy for arranging the relations in a diagrammatic space such that the graph highlights the symmetric structure of the relation set.
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References
Freksa, C.: Temporal Reasoning Based on Semi-Intervals. Artificial Intelligence 54, 199–227 (1992)
Egenhofer, M., Al-Taha, K.: Reasoning about Gradual Changes of Topological Relationships. In: Frank, A., Campari, I., Formentini, U. (eds.) GIS 1992. LNCS, vol. 639, pp. 196–219. Springer, Heidelberg (1992)
Hornsby, K., Egenhofer, M., Hayes, P.: Modeling Cyclic Change. In: Chen, P., Embley, D., Kouloumdjian, J., Liddle, S., Roddick, J. (eds.) Advances in Conceptual Modeling. LNCS, vol. 1227, pp. 98–109. Springer, Heidelberg (1999)
Egenhofer, M.: Spherical Topological Relations. Journal on Data Semantics III, 25–49 (2005)
Kurata, Y., Egenhofer, M.: The Head-Body-Tail Intersection for Spatial Relations between Directed Line Segments. In: Raubal, M., Miller, H., Frank, A., Goodchild, M. (eds.) GIScience 2006. LNCS, vol. 4197, pp. 269–286. Springer, Heidelberg (2006)
Kurata, Y., Egenhofer, M.: The 9+-Intersection for Topological Relations between a Directed Line Segment and a Region. In: Gottfried, B. (ed.) 1st International Symposium for Behavioral Monitoring and Interpretation, pp. 62–76 (2007)
Egenhofer, M., Herring, J.: Categorizing Binary Topological Relationships between Regions, Lines and Points in Geographic Databases. In: Egenhofer, M., Herring, J., Smith, T., Park, K. (eds.) NCGIA Technical Reports 91-7, pp. 91–97. NCGIA, Santa Barbara (1991)
Allen, J.: Maintaining Knowledge about Temporal Intervals. Communications of the ACM 26, 832–843 (1983)
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Kurata, Y. (2008). A Strategy for Drawing a Conceptual Neighborhood Diagram Schematically. In: Stapleton, G., Howse, J., Lee, J. (eds) Diagrammatic Representation and Inference. Diagrams 2008. Lecture Notes in Computer Science(), vol 5223. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-540-87730-1_44
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DOI: https://doi.org/10.1007/978-3-540-87730-1_44
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