Add to ORKGThe goal of enumerative combinatorics is to count the number of some well described objects. We extend the algorithm of Bean et al. that automates this process to work with binary strings and set partitions. This involves teaching the computer about binary strings, set partitions, and the ideas behind the proofs of results in this area
AbstractWe study the relationship between a computably enumerable real and its presentations: ways o...
AbstractWe enumerate set partitions by strings of consecutive elements, or successions, and obtain a...
Discrete structure manipulation is a fundamental technique for many problems solved by computers. BD...
Focusing on a very active area of mathematical research in the last decade, Combinatorics of Set Par...
A large number of combinatorial structures can be specified using context free grammars. These gramm...
The focus of this thesis lies on the application of enumerative combinatorics to the partition latti...
This short paper introduces a code snippet in the form of an R function that enumerates all possible...
Enumeration is an important aspect for combinatorial properties of binary trees. Traditional solutio...
Partitions of an integer have found extensive application in combinatorics [1, 14, 17], group repres...
Computational combinatorics involves combining pure mathematics, algorithms, and computational resou...
A subsequence is obtained from a string by deleting any number of characters; thus in contrast to a ...
Knowledge about combinatorics, integers, nested patterns, number theory, representations of numbers ...
Enumerative combinatorics is about counting. The typical question is to find the number of objects w...
This short paper introduces a code snippet in the form of an R function that enumerates all possible...
This vignette is based on Hankin (2007a). This short paper introduces a code snippet in the form of ...
AbstractWe study the relationship between a computably enumerable real and its presentations: ways o...
AbstractWe enumerate set partitions by strings of consecutive elements, or successions, and obtain a...
Discrete structure manipulation is a fundamental technique for many problems solved by computers. BD...
Focusing on a very active area of mathematical research in the last decade, Combinatorics of Set Par...
A large number of combinatorial structures can be specified using context free grammars. These gramm...
The focus of this thesis lies on the application of enumerative combinatorics to the partition latti...
This short paper introduces a code snippet in the form of an R function that enumerates all possible...
Enumeration is an important aspect for combinatorial properties of binary trees. Traditional solutio...
Partitions of an integer have found extensive application in combinatorics [1, 14, 17], group repres...
Computational combinatorics involves combining pure mathematics, algorithms, and computational resou...
A subsequence is obtained from a string by deleting any number of characters; thus in contrast to a ...
Knowledge about combinatorics, integers, nested patterns, number theory, representations of numbers ...
Enumerative combinatorics is about counting. The typical question is to find the number of objects w...
This short paper introduces a code snippet in the form of an R function that enumerates all possible...
This vignette is based on Hankin (2007a). This short paper introduces a code snippet in the form of ...
AbstractWe study the relationship between a computably enumerable real and its presentations: ways o...
AbstractWe enumerate set partitions by strings of consecutive elements, or successions, and obtain a...
Discrete structure manipulation is a fundamental technique for many problems solved by computers. BD...