Add to ORKGMatroids capture an abstraction of independence in mathematics, and in doing so, connect discrete mathematical structures that arise in a variety of contexts. A matroid can be defined in several cryptomorphic ways depending on which perspective of a matroid is most applicable to the given context. Among the many important concepts in matroid theory, the concept of matroid duality provides a powerful tool when addressing difficult problems. The usefulness of matroid duality stems from the fact that the dual of a matroid is itself a matroid. In this thesis, we explore a matroid-like object called a flag matroid. In particular, we suggest a notion of duality for flag matroids and we investigate the implications of this notion
AbstractSeveral combinatorial structures exhibit a duality relation that yields interesting theorems...
Algebraic matroids are combinatorial objects that can be extracted from geometric problems, describi...
The mutually enriching relationship between graphs and matroids has motivated discoveries in both f...
A matroid is a mathematical object that generalizes and connects notions of independence that arise ...
Abstract. Matroids were introduced by Whitney in 1935 to try to capture abstractly the essence of de...
AbstractThe Möbius invariant μ, essential to the classification of surfaces, is less useful in the s...
AbstractIn hopes of better understanding graph-theoretic duality, a syntactical ‘duality principle’ ...
In recent years, surprising connections between applications including algebraic statistics and the ...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
Dress A. Duality theory for finite and infinite matroids with coefficients. Advances in Mathematics....
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
Matroids are combinatorial structures that generalize the properties of linear independence. But not...
Abstract. Matroids were introduced by Whitney in 1935 to try to capture abstractly the essence of de...
We begin by introducing matroids in the context of finite collections of vectors from a vector space...
Algebraic matroids are combinatorial objects defined by the set of coordinates of an algebraic varie...
AbstractSeveral combinatorial structures exhibit a duality relation that yields interesting theorems...
Algebraic matroids are combinatorial objects that can be extracted from geometric problems, describi...
The mutually enriching relationship between graphs and matroids has motivated discoveries in both f...
A matroid is a mathematical object that generalizes and connects notions of independence that arise ...
Abstract. Matroids were introduced by Whitney in 1935 to try to capture abstractly the essence of de...
AbstractThe Möbius invariant μ, essential to the classification of surfaces, is less useful in the s...
AbstractIn hopes of better understanding graph-theoretic duality, a syntactical ‘duality principle’ ...
In recent years, surprising connections between applications including algebraic statistics and the ...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
Dress A. Duality theory for finite and infinite matroids with coefficients. Advances in Mathematics....
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
Matroids are combinatorial structures that generalize the properties of linear independence. But not...
Abstract. Matroids were introduced by Whitney in 1935 to try to capture abstractly the essence of de...
We begin by introducing matroids in the context of finite collections of vectors from a vector space...
Algebraic matroids are combinatorial objects defined by the set of coordinates of an algebraic varie...
AbstractSeveral combinatorial structures exhibit a duality relation that yields interesting theorems...
Algebraic matroids are combinatorial objects that can be extracted from geometric problems, describi...
The mutually enriching relationship between graphs and matroids has motivated discoveries in both f...