Preferential Arrangement Superpatterns

Biers-Ariel, Yonah, Godbole, Anant, Zhang, Yiguang

01 October 2016

A superpattern is a string of characters of length n that contains as a subsequence, and in a sense that depends on the context, all the smaller strings of length k in a certain class. We prove structural and probabilistic results on superpatterns for preferential arrangements, including (i) a theorem that demonstrates that a string is a superpattern for all preferential arrangements if and only if it is a superpattern for all permutations; and (ii) a result that is reminiscent of a still unresolved conjecture of Alon on the smallest permutation on [n] that contains all k-permutations with high probability.

permutation

preferential arrangements

superpattern

Mathematics and Statistics

Preferential Arrangement Containment in Strict Superpatterns

Liendo, Martha Louise

05 May 2012

Most results on pattern containment deal more directly with pattern avoidance, or the enumeration and characterization of strings which avoid a given set of patterns. Little research has been conducted regarding the word size required for a word to contain all patterns of a given set of patterns. The set of patterns for which containment is sought in this thesis is the set of preferential arrangements of a given length. The term preferential arrangement denotes strings of characters in which repeated characters are allowed, but not necessary. Cardinalities for sets of all preferential arrangements of given lengths and alphabet sizes are found, as well as cardinalities for sets where reversals fall into the same equivalence class and for sets in higher dimensions. The minimum word length and the word length necessary for a strict superpattern to contain all preferential arrangements for alphabet sizes two and three are also detailed.

preferential arrangements

superpatterns

pattern containment

Discrete Mathematics and Combinatorics

Mathematics

Physical Sciences and Mathematics