A complete tree is a graph corresponding to a complete 
-ary tree on 
nodes.
Complete trees are implemented in the Wolfram Language as KaryTree[n, k].
Complete Tree
See also
Complete Binary Tree, Complete Ternary TreeExplore with Wolfram|Alpha
References
House of Graphs. Complete Trees. Claw Graph (K1,3), T3,2,3, Complete Binary Tree, height 3 (4 rows, 15 vertices), Complete Binary Tree, height 4 (5 rows, 31 vertices), complete ternary tree of depth 3, Complete Ternary Tree, height 3 (4 rows, 40 vertices), Complete Ternary Tree, height 4 (5 rows, 121 vertices), Complete 4-ary Tree, height 2 (3 rows, 21 vertices), Complete 4-ary Tree, height 3 (4 rows, 85 vertices), P3 = K1,2, Singleton Graph, Star K1,4, K1,5, Star K1,6, K1,7, K1,8, K1,9, K1,10, K1,11, 13-star graph, 14-star graph, 15-star graph, 16-star graph, 17-star graph, 18-star graph, 19-star graph, and 20-star graph.Referenced on Wolfram|Alpha
Complete TreeCite this as:
Weisstein, Eric W. "Complete Tree." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/CompleteTree.html
