Add to ORKGThe algebra of throws is a geometric construction which reveals the underlying algebraic operations of addition and multiplication in a projective plane. In Desarguesian projective planes, the algebra of throws is a well-defined, commutative and associative binary operation. However, when we consider an analogous operation in a more general point-line configuration that comes from rank-3 matroids, none of these properties are guaranteed. We construct lists of forbidden configurations which give polynomial time checks for certain properties. Using these forbidden configurations, we can check whether a configuration has a group structure under this analogous operation. We look at the properties of configurations with such a group structure, a...
Matroids have a wide variety of distinct, cryptomorphic axiom systems that are capable of defining t...
In chapter 2, we study a special decomposition intoduced by Lafforgue. More precisely, let P(M) be t...
AbstractA construction of Tits is used to cast the argument of Kilmoyer-Solomon and Higman proving t...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
AbstractThis article deals with algorithmic and structural aspects related to the computer-aided stu...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
This thesis investigates the structure of the projective coordinate rings of SL(n,C) weight varieti...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
AbstractGiven a graph G (or more generally a matroid embedded in a projective space), we construct a...
In combinatorics, a matroid is a discrete object that generalizes various notions of dependence that...
We introduce the intersection cohomology module of a matroid and prove that it satisfies Poincar\'e ...
Matroids have a wide variety of distinct, cryptomorphic axiom systems that are capable of defining t...
In chapter 2, we study a special decomposition intoduced by Lafforgue. More precisely, let P(M) be t...
AbstractA construction of Tits is used to cast the argument of Kilmoyer-Solomon and Higman proving t...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
The algebra of throws is a geometric construction which reveals the underlying algebraic operations ...
AbstractThis article deals with algorithmic and structural aspects related to the computer-aided stu...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
This thesis investigates the structure of the projective coordinate rings of SL(n,C) weight varieti...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
AbstractGiven a graph G (or more generally a matroid embedded in a projective space), we construct a...
In combinatorics, a matroid is a discrete object that generalizes various notions of dependence that...
We introduce the intersection cohomology module of a matroid and prove that it satisfies Poincar\'e ...
Matroids have a wide variety of distinct, cryptomorphic axiom systems that are capable of defining t...
In chapter 2, we study a special decomposition intoduced by Lafforgue. More precisely, let P(M) be t...
AbstractA construction of Tits is used to cast the argument of Kilmoyer-Solomon and Higman proving t...