Note on packing patterns in colored permutations

Matthew Just, Hua Wang

Research output: Contribution to journalArticlepeer-review

3 Scopus citations

Abstract

Packing patterns in permutations concerns finding the permutation with the maximum number of a prescribed pattern. In 2002, Albert, Atkinson, Handley, Holton and Stromquist showed that there always exists a layered permutation containing the maximum number of a layered pattern among all permutations of length n. Consequently the packing density for all but two (up to equivalence) patterns up to length 4 can be obtained. In this note we consider the analogous question for colored patterns and permutations. By introducing the concept of "colored blocks" we characterize the optimal permutations with the maximum number of a given colored pattern when it contains at most three colored blocks. As examples we apply this characterization to find the optimal permutations of various colored patterns and subsequently obtain their corresponding packing densities.

Original languageEnglish
JournalOnline Journal of Analytic Combinatorics
Issue number11
StatePublished - 2016

Scopus Subject Areas

  • Discrete Mathematics and Combinatorics

Keywords

  • Density
  • Packing
  • Pattern
  • Permutation

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