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Distance-Based Topological Indices of Tensor Product of Graphs
, 2012 Let G and H be connected graphs. The tensor product G + H is a graph with vertex set V(G+H) = V (G) X V(H) and edge set E(G + H) ={(a , b)(x , y)| ax ∈ E(G) & by ∈ E(H)}. The graph H is called the strongly triangular if for every vertex u and v there exists a vertex w adjacent to both of them.
H. Khodashenas, M J Nadjafi Arani
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Ordered Topological Tensor Products†
Proceedings of the London Mathematical Society, 1969 Anthony L. Peressini, D. R. Sherbert
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The action of tensor product for topological groupoids
AIP Conference ProceedingsSeemaa Mohammed Ali, Taghreed Hur Majeed
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43 The Two Main Topologies on Tensor Products. Completion of Topological Tensor Products
, 1967 openalex +2 more sources
44 Examples of Completion of Topological Tensor Products: Products ε
, 1967 openalex +2 more sources
BOUNDS OF TOPOLOGICAL INDICES OF TENSOR PRODUCT OF GRAPH OPERATIONS
Far East Journal of Mathematical Sciences (FJMS), 2017 Muhammad Imran +3 more
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Tensor Products in Categories of Topological Spaces
Applied Categorical Structures, 1997In this paper symmetric monoidal closed structures on coreflective subcategories of the category of (Hausdorff) topological spaces are studied. It is shown that the category \(\mathcal P\)\textit{srad} of pseudoradial spaces, i.e., spaces for which each nonclosed subset \(A\) contains a well ordered net that converges to a point not in \(A\), admits at
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