Generalized degree polynomials of trees

Abstract

The generalized degree polynomial GT(x,y,z) of a tree T is an invariant introduced by Crew that enumerates subsets of vertices by size and number of internal and boundary edges. Aliste-Prieto et al. proved that GT is determined linearly by the chromatic symmetric function XT, introduced by Stanley. We present several classes of information about T that can be recovered from GT and hence also from XT. Examples of such information include the double-degree sequence of T, which enumerates edges of T by the pair of degrees of their endpoints, and the leaf adjacency sequence of T, which enumerates vertices of T by degree and number of adjacent leaves. We also discuss a further generalization of GT that enumerates tuples of vertex sets and show that this is also determined by XT.

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