Add to ORKGAbstract. It is well-known, and was first established by Knuth in 1969, that the number of 321-avoiding permuta-tions is equal to that of 132-avoiding permutations. In the literature one can find many subsequent bijective proofs confirming this fact. It turns out that some of the published bijections can easily be obtained from others. In this paper we describe all bijections we were able to find in the literature and we show how they are related to each other (via “trivial ” bijections). Thus, we give a comprehensive survey and a systematic analysis of these bijections. We also analyze how many permutation statistics (from a fixed, but large, set of statistics) each of the known bijections preserves, obtaining substantial extensions of kno...
This thesis is dedicated to the enumeration of subclasses of 321-avoiding permutations, using a comb...
none3siWe define a map between the set of permutations that avoid either the four patterns 3214, 324...
We show that the counting sequence for permutations avoiding both of the (clas-sical) patterns 1243 ...
It is well-known, and was first established by Knuth in 1969, that the number of 321-avoiding permut...
It is well-known, and was first established by Knuth in 1969, that the number of 321-avoiding permut...
AbstractWe exhibit a bijection between 132-avoiding permutations and Dyck paths. Using this bijectio...
AbstractBy considering bijections from the set of Dyck paths of length 2n onto each of Sn(321) and S...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2004.Includes bibliogr...
We prove that the number of permutations which avoid 132-patterns and have exactly one 123-patter...
We will study the inversion statistic of 321-avoiding permutations, and obtain that the number of 32...
AbstractIn Bloom and Saracino (2009) [2] we proved that a natural bijection Γ:Sn(321)→Sn(132) that R...
Using an unprecedented technique involving diagonals of non-rational generating functions, we prove ...
AbstractThe diagram of a 132-avoiding permutation can easily be characterized: it is simply the diag...
Abstract. Motivated by the relations between certain difference statistics and the classical permuta...
We consider permutations that avoid the pattern 1324. We give exact formulas for thenumber of reduci...
This thesis is dedicated to the enumeration of subclasses of 321-avoiding permutations, using a comb...
none3siWe define a map between the set of permutations that avoid either the four patterns 3214, 324...
We show that the counting sequence for permutations avoiding both of the (clas-sical) patterns 1243 ...
It is well-known, and was first established by Knuth in 1969, that the number of 321-avoiding permut...
It is well-known, and was first established by Knuth in 1969, that the number of 321-avoiding permut...
AbstractWe exhibit a bijection between 132-avoiding permutations and Dyck paths. Using this bijectio...
AbstractBy considering bijections from the set of Dyck paths of length 2n onto each of Sn(321) and S...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2004.Includes bibliogr...
We prove that the number of permutations which avoid 132-patterns and have exactly one 123-patter...
We will study the inversion statistic of 321-avoiding permutations, and obtain that the number of 32...
AbstractIn Bloom and Saracino (2009) [2] we proved that a natural bijection Γ:Sn(321)→Sn(132) that R...
Using an unprecedented technique involving diagonals of non-rational generating functions, we prove ...
AbstractThe diagram of a 132-avoiding permutation can easily be characterized: it is simply the diag...
Abstract. Motivated by the relations between certain difference statistics and the classical permuta...
We consider permutations that avoid the pattern 1324. We give exact formulas for thenumber of reduci...
This thesis is dedicated to the enumeration of subclasses of 321-avoiding permutations, using a comb...
none3siWe define a map between the set of permutations that avoid either the four patterns 3214, 324...
We show that the counting sequence for permutations avoiding both of the (clas-sical) patterns 1243 ...