Search results for "05c60"

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About Graph Mappings

2019

Summary In this articles adjacency-preserving mappings from a graph to another are formalized in the Mizar system [7], [2]. The generality of the approach seems to be largely unpreceeded in the literature to the best of the author’s knowledge. However, the most important property defined in the article is that of two graphs being isomorphic, which has been extensively studied. Another graph decorator is introduced as well.

Discrete mathematicsgraph isomorphism05c60Applied Mathematics020207 software engineering0102 computer and information sciences02 engineering and technology68t9901 natural sciencesComputational Mathematicsgraph homomorphism03b35010201 computation theory & mathematics0202 electrical engineering electronic engineering information engineeringQA1-939Graph (abstract data type)Graph homomorphismGraph isomorphismMathematicsMathematicsFormalized Mathematics
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About Vertex Mappings

2019

Summary In [6] partial graph mappings were formalized in the Mizar system [3]. Such mappings map some vertices and edges of a graph to another while preserving adjacency. While this general approach is appropriate for the general form of (multidi)graphs as introduced in [7], a more specialized version for graphs without parallel edges seems convenient. As such, partial vertex mappings preserving adjacency between the mapped verticed are formalized here.

graph isomorphismVertex (graph theory)05c60Applied Mathematics68t99CombinatoricsComputational Mathematicsgraph homomorphism03b35QA1-939Graph homomorphismGraph isomorphismMathematicsMathematicsofComputing_DISCRETEMATHEMATICSMathematicsFormalized Mathematics
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