Generalized Goulden-Yong duals and signed minimal factorizations
Abstract
We show the equivalence between one-way reflections and relative projective representations. We construct generalized Goulden-Yong duals using reverse Garside element actions and folded chord diagrams. We give two applications of the generalized Goulden-Yong duals: constructing generalized Pr\"ufer codes and counting signed factorizations using the matrix-tree theorem.
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