English

Minimal Permutations and 2-Regular Skew Tableaux

Combinatorics 2010-11-01 v1

Abstract

Bouvel and Pergola introduced the notion of minimal permutations in the study of the whole genome duplication-random loss model for genome rearrangements. Let Fd(n)\mathcal{F}_d(n) denote the set of minimal permutations of length nn with dd descents, and let fd(n)=Fd(n)f_d(n)= |\mathcal{F}_d(n)|. They derived that fn2(n)=2n(n1)n2f_{n-2}(n)=2^{n}-(n-1)n-2 and fn(2n)=Cnf_n(2n)=C_n, where CnC_n is the nn-th Catalan number. Mansour and Yan proved that fn+1(2n+1)=2n2nCn+1f_{n+1}(2n+1)=2^{n-2}nC_{n+1}. In this paper, we consider the problem of counting minimal permutations in Fd(n)\mathcal{F}_d(n) with a prescribed set of ascents. We show that such structures are in one-to-one correspondence with a class of skew Young tableaux, which we call 22-regular skew tableaux. Using the determinantal formula for the number of skew Young tableaux of a given shape, we find an explicit formula for fn3(n)f_{n-3}(n). Furthermore, by using the Knuth equivalence, we give a combinatorial interpretation of a formula for a refinement of the number fn+1(2n+1)f_{n+1}(2n+1).

Keywords

Cite

@article{arxiv.1010.6261,
  title  = {Minimal Permutations and 2-Regular Skew Tableaux},
  author = {William Y. C. Chen and Cindy C. Y. Gu and Kevin J. Ma},
  journal= {arXiv preprint arXiv:1010.6261},
  year   = {2010}
}

Comments

19 pages

R2 v1 2026-06-21T16:36:12.617Z