In graph theory, the tensor product G × H of graphs G and H is a graph such that vertices (g,h) and (g',h' ) are adjacent in G × H if and only if Examples · Properties |
22 окт. 2024 г. · The tensor product G H of graphs G and H is the graph with point set V(G) × V(H) where (υ1, ν1) adj (υ2, ν2) if, and only if, ... |
| Тензорное произведение графов |  |
Тензорное произведение графов и — граф, множество вершин которого есть декартово произведение, причём различные вершины и смежны в тогда и только тогда, когда смежна с и смежна с. Википедия
We now define the tensor product of two graphs [8] as follows: The tensor product of two graphs G1 and G2 is the graph, denoted by G1 ⊕ G2, with vertex set. V ( ... |
Videolar The graph tensor product of simple graphs G and H is given by A(G×H)=A(G) tensor A(H), where tensor denotes the Kronecker product. |
The tensor product G ⊕ H of graphs G and H is the graph with point set V(G) × V(H) where (υ1, ν1) adj (υ2, ν2) if, and only if, u1 adj υ2 and ν1 adj ν2. |
In this paper, we introduce four new tensor products of graphs and study the first and second Zagreb indices and coindices of the resulting graphs and their. |
Abstract. Let G and H be graphs. The tensor product G ⊗ H of G and H has vertex set V (G ⊗ H) = V (G) × V (H), edge set E(G ⊗ H) =. |
In this paper, we study the existence, construction and number of (2-d)-kernels in the tensor product of paths, cycles and complete graphs. |
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