On Dasgupta’s Hierarchical Clustering Objective and Its Relation to Other Graph Parameters
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Datum
2021-01Typ
- Conference Paper
ETH Bibliographie
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Abstract
The minimum height of vertex and edge partition trees are well-studied graph parameters known as, for instance, vertex and edge ranking number. While they are NP-hard to determine in general, linear-time algorithms exist for trees. Motivated by a correspondence with Dasgupta’s objective for hierarchical clustering we consider the total rather than maximum depth of vertices as an alternative objective for minimization. For vertex partition trees this leads to a new parameter with a natural interpretation as a measure of robustness against vertex removal.
As tools for the study of this family of parameters we show that they have similar recursive expressions and prove a binary tree rotation lemma. The new parameter is related to trivially perfect graph completion and therefore intractable like the other three are known to be. We give polynomial-time algorithms for both total-depth variants on caterpillars and on trees with a bounded number of leaf neighbors. For general trees, we obtain a 2-approximation algorithm. Mehr anzeigen
Publikationsstatus
publishedExterne Links
Buchtitel
Fundamentals of Computation TheoryZeitschrift / Serie
Lecture Notes in Computer ScienceBand
Seiten / Artikelnummer
Verlag
SpringerKonferenz
Organisationseinheit
09610 - Brandes, Ulrik / Brandes, Ulrik
ETH Bibliographie
yes
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