Robert Brignall, Sophie Huczynska, Vincent Vatter
Published 2006-08-15Version 1
A simple permutation is one that does not map a nontrivial interval onto an interval. It was recently proved by Albert and Atkinson that a permutation class with only finitely simple permutations has an algebraic generating function. We extend this result to enumerate permutations in such a class satisfying additional properties, e.g., the even permutations, the involutions, the permutations avoiding generalised permutations, and so on.
Enumerating two permutation classes by number of cycles
Permutations sortable by n-4 passes through a stack
Pattern avoidance in compositions and powers of permutations
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