Add to ORKGStar configurations are certain unions of linear subspaces of projective space that have been studied extensively. We develop a framework for studying a substantial generalization, which we call matroid configurations, whose ideals generalize Stanley-Reisner ideals of matroids. Such a matroid configuration is a union of complete intersections of a fixed codimension. Relating these to the Stanley-Reisner ideals of matroids and using methods of liaison theory allows us, in particular, to describe the Hilbert function and minimal generators of the ideal of, what we call, a hypersurface configuration. We also establish that the symbolic powers of the ideal of any matroid configuration are Cohen-Macaulay. As applications, we study ideals coming ...
This thesis investigates the structure of the projective coordinate rings of SL(n,C) weight varieti...
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
Star configurations are certain unions of linear subspaces of projective space. They have appeared i...
This dissertation is devoted to the study of the geometric properties of subspace configurations, wi...
Making use of algebraic and combinatorial techniques, we study two topics: the arithmetic degree of ...
AbstractWe prove that for m⩾3, the symbolic power IΔ(m) of a Stanley–Reisner ideal is Cohen–Macaulay...
As a matroid is naturally a simplicial complex, one can study its combinatorial properties via the a...
AbstractZonotopal algebra deals with ideals and vector spaces of polynomials that are related to sev...
Matroids are combinatorial abstractions of hyperplane arrangements, and have been a bridge for fruit...
Let I ⊆ k[P N] be a homogeneous ideal and k an algebraically closed field. Of particular interest ov...
Given a homogeneous ideal I ⊆ k[x0, …, xn ], the Containment problem studies the relation between sy...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
We study an operation in matroid theory that allows one to transition a given matroid into another w...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
This thesis investigates the structure of the projective coordinate rings of SL(n,C) weight varieti...
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...
Star configurations are certain unions of linear subspaces of projective space. They have appeared i...
This dissertation is devoted to the study of the geometric properties of subspace configurations, wi...
Making use of algebraic and combinatorial techniques, we study two topics: the arithmetic degree of ...
AbstractWe prove that for m⩾3, the symbolic power IΔ(m) of a Stanley–Reisner ideal is Cohen–Macaulay...
As a matroid is naturally a simplicial complex, one can study its combinatorial properties via the a...
AbstractZonotopal algebra deals with ideals and vector spaces of polynomials that are related to sev...
Matroids are combinatorial abstractions of hyperplane arrangements, and have been a bridge for fruit...
Let I ⊆ k[P N] be a homogeneous ideal and k an algebraically closed field. Of particular interest ov...
Given a homogeneous ideal I ⊆ k[x0, …, xn ], the Containment problem studies the relation between sy...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
We study an operation in matroid theory that allows one to transition a given matroid into another w...
This book discusses regular powers and symbolic powers of ideals from three perspectives– algebra, c...
This thesis investigates the structure of the projective coordinate rings of SL(n,C) weight varieti...
OSCAR is an innovative new computer algebra system which combines and extends the power of its four ...
This paper studies the properties of two kinds of matroids: (a) algebraic matroids and (b) finite an...