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AKCE International Journal of Graphs and Combinatorics Volume 18, 2021 - Issue 2
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Articles

Antimagic labeling of new classes of trees

G. SethuramanDepartment of Mathematics, Anna University, CEG Campus, Chennai, IndiaCorrespondence[email protected] [email protected]
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K. M. ShermilyDepartment of Mathematics, Anna University, CEG Campus, Chennai, IndiaView further author information
Pages 110-116 | Received 22 Apr 2021, Accepted 31 Jul 2021, Published online: 31 Aug 2021

Figures & data

Figure 1. Binomial trees.

Figure 1. Binomial trees.

Figure 2. Fibonacci trees.

Figure 2. Fibonacci trees.

Figure 3. Representation of vertices and edges of B4.

Figure 3. Representation of vertices and edges of B4.

Figure 4. Edge labels with induced vertex labels of B4.

Figure 4. Edge labels with induced vertex labels of B4.

Figure 5. Representation of left and right sub-trees of F4.

Figure 5. Representation of left and right sub-trees of F4.

Figure 6. Naming the pendant vertices of F0R,F1L,F1R,F2L,F2R in F5.

Figure 6. Naming the pendant vertices of F0R,F1L,F1R,F2L,F2R in F5.

Figure 7. Naming the pendant vertices of F3L,F3R in F5.

Figure 7. Naming the pendant vertices of F3L,F3R in F5.

Figure 8. Representation of vertices and edges of F5.

Figure 8. Representation of vertices and edges of F5.

Figure 9. Antimagic labeling of Fibonacci tree F5.

Figure 9. Antimagic labeling of Fibonacci tree F5.

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