A theorem of Birkhoff which states that there is a bijection between the class of all geometric lattices and the class of all simple matroids is generalized here to larger classes of atomistic lattices and clutters
AbstractA geometric lattice is a frame if its matroid, possibly after enlargement, has a basis such ...
The τ=2 Conjecture, the Replication Conjecture and the f-Flowing Conjecture, and the classification ...
The τ=2 Conjecture, the Replication Conjecture and the f-Flowing Conjecture, and the classification ...
A theorem of Birkhoff which states that there is a bijection between the class of all geometric latt...
In this paper we introduce a notation of a semimatroid and we try to justify this new concept, which...
AbstractRepresentations of matroids in semimodular lattices and Coxeter matroids in chamber systems ...
AbstractThe bases and the cocircuits of a matroid form a blocking pair of clutters; this fact leads ...
Here is attempted an examination of three aspects of the lattice [theta](S) of congruence relations ...
AbstractExtending former results by G. Grätzer and E.W. Kiss (1986) [5] and M. Wild (1993) [9] on fi...
AbstractChein, Habib and Maurer's representation of a partitive lattice by atomic extensions is gene...
Pseudomodular lattices were defined and characterized by A. Bjömer and L. Lovász. Lattices of algebr...
AbstractWe give necessary and sufficient conditions for a lattice of finite length to be dually atom...
We extend the theory of atomized semilattices to the infinite setting. We show that it is well-defin...
We prove that a finite atomistic lattice can be represented as a lattice of quasivarieties if and on...
This chapter discusses the bouquets of geometric lattices. Matroid theory is in the center of Combin...
AbstractA geometric lattice is a frame if its matroid, possibly after enlargement, has a basis such ...
The τ=2 Conjecture, the Replication Conjecture and the f-Flowing Conjecture, and the classification ...
The τ=2 Conjecture, the Replication Conjecture and the f-Flowing Conjecture, and the classification ...
A theorem of Birkhoff which states that there is a bijection between the class of all geometric latt...
In this paper we introduce a notation of a semimatroid and we try to justify this new concept, which...
AbstractRepresentations of matroids in semimodular lattices and Coxeter matroids in chamber systems ...
AbstractThe bases and the cocircuits of a matroid form a blocking pair of clutters; this fact leads ...
Here is attempted an examination of three aspects of the lattice [theta](S) of congruence relations ...
AbstractExtending former results by G. Grätzer and E.W. Kiss (1986) [5] and M. Wild (1993) [9] on fi...
AbstractChein, Habib and Maurer's representation of a partitive lattice by atomic extensions is gene...
Pseudomodular lattices were defined and characterized by A. Bjömer and L. Lovász. Lattices of algebr...
AbstractWe give necessary and sufficient conditions for a lattice of finite length to be dually atom...
We extend the theory of atomized semilattices to the infinite setting. We show that it is well-defin...
We prove that a finite atomistic lattice can be represented as a lattice of quasivarieties if and on...
This chapter discusses the bouquets of geometric lattices. Matroid theory is in the center of Combin...
AbstractA geometric lattice is a frame if its matroid, possibly after enlargement, has a basis such ...
The τ=2 Conjecture, the Replication Conjecture and the f-Flowing Conjecture, and the classification ...
The τ=2 Conjecture, the Replication Conjecture and the f-Flowing Conjecture, and the classification ...
DOI
Add to ORKG