Baker and Bowler defined a category of algebraic objects called tracts which generalize both partial fields and hyperfields. They also defined a notion of weak and strong matroids over a tract $F$, and proved that if $F$ is perfect, meaning that $F$-vectors and $F$-covectors are orthogonal for every matroid over $F$, then the notions of weak and strong $F$-matroids coincide. We define the class of strongly fused tracts and prove that such tracts are perfect. We in fact prove a more general result which implies that given a tract $F$, there is a tract $\sigma (F)$ with the same 3-term additive relations as $F$ such that weak $F$-matroids coincide with strong $\sigma (F)$-matroids. We also show that both partial fields and stringent hyperfiel...
Matroids with coefficients, recently introduced by Dress [4], generalize ordinary matroids, Tutte re...
We show that a field extension $K\subseteq L$ in positive characteristic $p$ and elements $x_e\in L$...
Let $M_1$ and $M_2$ be matroids such that $M_2$ arises from $M_1$ by relaxing a circuit-hyperplane. ...
A hyperfield $H$ is stringent if $a\boxplus b$ is a singleton unless $a=-b$, for all $a,b\in H$. By ...
Matroids over tracts (Baker and Bowler, 2017) provide an algebraic framework simultaneously generali...
In [3], Nathan Bowler and the first author introduced a category of algebraic objects called tracts ...
AbstractThe simultaneously k- and (k − 1)-saturated chain partitions of a finite partially ordered s...
We construct a full embedding of the category of hyperfields into Dress's category of fuzzy rings an...
Bodlaender et al. [7] proved a converse to Courcelle's Theorem for graphs [15] for the class of chor...
We introduce the intersection cohomology module of a matroid and prove that it satisfies Poincar\'e ...
AbstractA partial fieldPis an algebraic structure that behaves very much like a field except that ad...
We give a semi-small orthogonal decomposition of the Chow ring of a matroid M. The decomposition is ...
AbstractThe bases and the cocircuits of a matroid form a blocking pair of clutters; this fact leads ...
We give a new proof, along with some generalizations, of a folklore theorem (attributed to Laurent L...
Matroid theory is the study of abstract properties of linear dependence. A matroid consists of a fin...
Matroids with coefficients, recently introduced by Dress [4], generalize ordinary matroids, Tutte re...
We show that a field extension $K\subseteq L$ in positive characteristic $p$ and elements $x_e\in L$...
Let $M_1$ and $M_2$ be matroids such that $M_2$ arises from $M_1$ by relaxing a circuit-hyperplane. ...
A hyperfield $H$ is stringent if $a\boxplus b$ is a singleton unless $a=-b$, for all $a,b\in H$. By ...
Matroids over tracts (Baker and Bowler, 2017) provide an algebraic framework simultaneously generali...
In [3], Nathan Bowler and the first author introduced a category of algebraic objects called tracts ...
AbstractThe simultaneously k- and (k − 1)-saturated chain partitions of a finite partially ordered s...
We construct a full embedding of the category of hyperfields into Dress's category of fuzzy rings an...
Bodlaender et al. [7] proved a converse to Courcelle's Theorem for graphs [15] for the class of chor...
We introduce the intersection cohomology module of a matroid and prove that it satisfies Poincar\'e ...
AbstractA partial fieldPis an algebraic structure that behaves very much like a field except that ad...
We give a semi-small orthogonal decomposition of the Chow ring of a matroid M. The decomposition is ...
AbstractThe bases and the cocircuits of a matroid form a blocking pair of clutters; this fact leads ...
We give a new proof, along with some generalizations, of a folklore theorem (attributed to Laurent L...
Matroid theory is the study of abstract properties of linear dependence. A matroid consists of a fin...
Matroids with coefficients, recently introduced by Dress [4], generalize ordinary matroids, Tutte re...
We show that a field extension $K\subseteq L$ in positive characteristic $p$ and elements $x_e\in L$...
Let $M_1$ and $M_2$ be matroids such that $M_2$ arises from $M_1$ by relaxing a circuit-hyperplane. ...