Hook Weighted Increasing Trees, Cayley Trees and Abel-Hurwitz Identities
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Recently F\'eray, Goulden and Lascoux gave a proof of a new hook summation formula for unordered increasing trees by means of a generalization of the Pr\"ufer code for labelled trees and posed the problem of finding a bijection between weighted increasing trees and Cayley trees. We give such a bijection, providing an answer to the problem posed by F\'eray, Goulden and Lascoux as well as showing a combinatorial connection to the theory of tree volumes defined by Kelmans. In addition we give two simple proofs of the hook summation formula. As an application we describe how the hook summation formula gives a combinatorial proof of a generalization of Abel and Hurwitz' theorem, originally proven by Strehl.
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Noncommutative Abel-like identities
Three noncommutative generalizations of the Abel-Hurwitz identities are established for sums over subsets of a finite set in a ring where X+Y is central.
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