Strong Central 2-Trees with Tail Degrees 2, 3: Structural Characterization and Uniqueness Criteria
Abstract
We study strong r-central 2-trees whose non-central vertices have degrees in \2,3\, focusing on the cases r=1,2,3. For each r, we derive exact degree constraints relating the maximum degree to the numbers of degree-3 and degree-2 tail vertices. In the unicentral case (r=1), we prove that the fan graph is the unique realization for all n 3. For bicentral 2-trees (r=2), we show that the number of degree-3 vertices is always even, establish sharp uniqueness results for x∈\0,2\, prove existence for all feasible values of , and obtain linear lower bounds on the number of non-isomorphic realizations. For tricentral 2-trees (r=3), we characterize extremal configurations, establish a divisibility constraint on the tail parameters, and prove a quadratic lower bound on the number of non-isomorphic graphs for infinitely many values of n. These results provide a unified structural framework for central 2-trees with bounded tail degrees and highlight sharp transitions between rigidity and combinatorial growth.
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