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Sigma KEE - GraphPath
 GraphPath(graph path) axis, coordinate_axis, dimension, major_axis, major_lobe, minor_axis, optic_axis, principal_axis, semimajor_axis, semiminor_axis, x-axis, y-axis, z-axis

 appearance as argument number 1 No TPTP formula. May not be expressible in strict first order. chinese_format.kif 2330-2333 No TPTP formula. May not be expressible in strict first order. Merge.kif 5620-5624 No TPTP formula. May not be expressible in strict first order. Merge.kif 5618-5618 Graph path is a subclass of directed graph

 appearance as argument number 2 No TPTP formula. May not be expressible in strict first order. Merge.kif 5935-5935 The range of maximal weighted path is an instance of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5910-5910 The range of minimal weighted path is an instance of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5976-5976 The values returned by cut set are subclasses of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5960-5960 The values returned by graph path are subclasses of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5984-5984 The values returned by minimal cut set are subclasses of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5650-5650 Graph circuit is a subclass of graph path No TPTP formula. May not be expressible in strict first order. chinese_format.kif 936-936 No TPTP formula. May not be expressible in strict first order. english_format.kif 1079-1079

 appearance as argument number 3 No TPTP formula. May not be expressible in strict first order. Merge.kif 5840-5840 The number 1 argument of begin node is an instance of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5851-5851 The number 1 argument of end node is an instance of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5870-5870 The number 1 argument of path weight is an instance of graph path No TPTP formula. May not be expressible in strict first order. Merge.kif 5810-5810 The number 1 argument of path length is an instance of graph path

 antecedent No TPTP formula. May not be expressible in strict first order. Merge.kif 5626-5636 If a graph is an instance of graph path and a graph arc is an instance of graph arc and the graph arc is a part of the graph,then if the starting node of the graph arc is equal to a graph node,then there doesn't exist another graph arc such that the starting node of the other graph arc is equal to the graph node and the other graph arc is not equal to the graph arc No TPTP formula. May not be expressible in strict first order. Merge.kif 5638-5648 If a graph is an instance of graph path and a graph arc is an instance of graph arc and the graph arc is a part of the graph,then if the terminal node of the graph arc is equal to a graph node,then there doesn't exist another graph arc such that the terminal node of the other graph arc is equal to the graph node and the other graph arc is not equal to the graph arc

 consequent No TPTP formula. May not be expressible in strict first order. Merge.kif 5530-5550 If a graph is an instance of graph and a graph node is an instance of graph node and another graph node is an instance of graph node and the graph node is a part of the graph and the other graph node is a part of the graph and the graph node is not equal to the other graph node,then there exist a graph arc and a graph path such that the graph arc links the graph node and the other graph node or the graph path is a subgraph of the graph and the graph path is an instance of graph path and the beginning of the graph path is equal to the graph node and the end of the graph path is equal to the other graph node or the beginning of the graph path is equal to the other graph node and the end of the graph path is equal to the graph node No TPTP formula. May not be expressible in strict first order. Transportation.kif 2806-2811 If the distance of a transitway is a constant quantity,then there exists an abstract such that the abstract is an instance of graph path and the abstract counterpart of the transitway is the abstract Show full definition with tree view
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