Some extremal ratios of the distance and subtree problems in binary trees

Abstract: Among many topological indices of trees the sum of distances σ(T ) and the number of subtrees F (T ) have been a long standing pair of graph invariants that are well known for their negative correlation. That is, among various given classes of trees, the extremal structures maximizing one usually minimize the other, and vice versa. By introducing the "local" versions of these invariants, σ T (v) for the sum of distance from v to all other vertices and F T (v) for the number of subtrees containing v, extremal p… Show more

“…Yang et al [17] studied the expected subtree number index in random polyphenylene and spiro chains. By introducing new "middle parts" of a tree, Li et al [19] studied several extreme ratios of distance and subtree problems in binary trees. With the combinatorial technique, Kamiński and Prałat [20] provided the upper and lower bounds for the number of subtrees of random tree.…”

On Subtree Number Index of Generalized Book Graphs, Fan Graphs, and Wheel Graphs

“…Yang et al [17] studied the expected subtree number index in random polyphenylene and spiro chains. By introducing new "middle parts" of a tree, Li et al [19] studied several extreme ratios of distance and subtree problems in binary trees. With the combinatorial technique, Kamiński and Prałat [20] provided the upper and lower bounds for the number of subtrees of random tree.…”

On Subtree Number Index of Generalized Book Graphs, Fan Graphs, and Wheel Graphs

Extremal problems on k-ary trees with respect to the cover cost and reverse cover cost

Enumeration of subtrees and BC-subtrees with maximum degree no more than k in trees