6533b7d9fe1ef96bd126cb63
RESEARCH PRODUCT
Exhaustive generation for permutations avoiding (colored) regular sets of patterns
Vincent VajnovszkiThi Thu Huong TranPhan Thuan Dosubject
Mathematics::CombinatoricsFibonacci numberApplied MathematicsPadovan sequence0211 other engineering and technologies021107 urban & regional planningField (mathematics)Context (language use)0102 computer and information sciences02 engineering and technology01 natural sciencesCombinatoricsSet (abstract data type)Colored010201 computation theory & mathematicsEnumerationDiscrete Mathematics and CombinatoricsBinomial transformMathematicsofComputing_DISCRETEMATHEMATICSMathematicsdescription
Abstract Despite the fact that the field of pattern avoiding permutations has been skyrocketing over the last two decades, there are very few exhaustive generating algorithms for such classes of permutations. In this paper we introduce the notions of regular and colored regular set of forbidden patterns, which are particular cases of right-justified sets of forbidden patterns. We show the (colored) regularity of several sets of forbidden patterns (some of them involving variable length patterns) and we derive a general framework for the efficient generation of permutations avoiding them. The obtained generating algorithms are based on succession functions, a notion which is a byproduct of the ECO method introduced in the context of enumeration and random generation of combinatorial objects. For some classes of permutations falling under our general framework, the corresponding counting sequences are classical in combinatorics, such as Pell, Fibonacci, Catalan, Schroder and binomial transform of Padovan sequence.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2019-09-01 | Discrete Applied Mathematics |