On countable RCC models

Region Connection Calculus (RCC) is the most widely studied formalism of Qualitative Spatial Reasoning. It has been known for some time that each connected regular topological space provides an RCC model. These 'standard' models are inevitable uncountable and regions there cannot be represented finitely. This paper, however, draws researchers' attention to RCC models that can be constructed from finite models hierarchically. Compared with those 'standard' models, these countable models have the nice property that regions where can be constructed in finite steps from basic ones. We first investigate properties of three countable models introduced by Düuntsch, Stell, Li and Ying, resp. In particular, we show that (i) the contact relation algebra of our minimal model is not atomic complete; and (ii) these three models are non-isomorphic. Second, for each n>0, we construct a countable RCC model that is a sub-model of the standard model over the Euclidean unit n-cube; and show that all these countable models are non-isomorphic. Third, we show that every finite model can be isomorphically embedded in any RCC model. This leads to a simple proof for the result that each consistent spatial network has a realization in any RCC model.

• Publication year

  2004

• Venue

  Fundamenta Informaticae

• Publication date

  2004-10-01

• Fields of study

  Mathematics, Computer Science

• Identifiers
  DOI 10.3233/FUN-2005-65403
• External record

  Open on Semantic Scholar

• Source metadata

  Semantic Scholar

• No claims are published for this paper.

• No concepts are published for this paper.

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• Generalized Region Connection Calculus

  2004influential reference
• Relation algebras and their application in qualitative spatial reasoning

  2003cited by this paper
• Region Connection Calculus: Its models and composition table

  2003influential reference
• Extensionality of the RCC8 Composition Table

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• Qualitative Spatial Reasoning with Topological Information

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• Boolean connection algebras: A new approach to the Region-Connection Calculus

  2000influential reference
• Topology in Raster and Vector Representation

  2000cited by this paper
• Topological Relations in Hierarchical Partitions

  1999cited by this paper
• The Mereotopology of Discrete Space

  1999cited by this paper
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• Relations algebras in qualitative spatial reasoning

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• A boundary-sensitive approach to qualitative location

  1998cited by this paper
• Modeling Topological Spatial Relations: Strategies for Query Processing

  1998cited by this paper
• Imprecision in Finite Resolution Spatial Data

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• Logical representations for automated reasoning about spatial relationships

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  1997cited by this paper
• Modal Logics for Qualitative Spatial Reasoning

  1996cited by this paper
• Computational Properties of Qualitative Spatial Reasoning: First Results

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• Modelling topological spatial relations: Strategies for query processing

  1994cited by this paper
• Spatial Reasoning with Propositional Logics

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• Qualitative and Topological Relationships in Spatial Databases

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• Modelling Topological and Metrical Properties in Physical Processes

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• Individuals and points.

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• A course in mathematical logic

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  2013cites this paper
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  2012cites this paper
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  2009cites this paper
• Axioms, Algebras and Topology

  2007cites this paper
• On minimal models of the Region Connection Calculus

  2006cites this paper
• Generalized Region Connection Calculus

  2004cites this paper
• Construction of Boolean contact algebras

  2004cites this paper