A finite projective plane, or more generally a finite linear space, has an associated incidence complex that gives rise to two natural algebras: the Stanley–Reisner ring R/IΛ and the inverse system algebra R/IΔ . We give a careful study of both of these algebras. Our main results are a full description of the graded Betti numbers of both algebras in the more general setting of linear spaces (giving the result for the projective planes as a special case), and a classification of the characteristics in which the inverse system algebra associated to a finite projective plane has the weak or strong Lefschetz Property
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
From a projective plane Π with involutory homology τ one constructs an incidence system Π/τ having a...
Ziel dieser Arbeit ist eine computerunterstützte Suche nach, bis auf Isomorphie, allen projektiven E...
A finite projective plane, or more generally a finite linear space, has an associated incidence comp...
In combinatorial mathematics, a Steiner system is a type of block design. Specifically, a Steiner sy...
The interaction between geometry and algebra is a diverse and fruitful area to explore. Of particula...
Includes bibliography.281 p ; 30 cm.Title page, contents and abstract only. The complete thesis in p...
summary:A combinatorial characterization of finite projective planes using strongly canonical forms ...
AbstractA linear representation (LR) of a projective plane π (Desarguesian or not) is an isomorphic ...
AbstractWe define and study algebraically flat algebras in order to have a better understanding of a...
Let Γ be a rank three incidence geometry of points, lines and planes whose planes are linear spaces ...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
In this thesis we answer two questions relating to numerical invariants of rings and modules. In par...
AbstractIn this paper linear sets of finite projective spaces are studied and the “dual” of a linear...
AbstractSemiadditive rings are defined and their relationship with the projective planes is studied....
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
From a projective plane Π with involutory homology τ one constructs an incidence system Π/τ having a...
Ziel dieser Arbeit ist eine computerunterstützte Suche nach, bis auf Isomorphie, allen projektiven E...
A finite projective plane, or more generally a finite linear space, has an associated incidence comp...
In combinatorial mathematics, a Steiner system is a type of block design. Specifically, a Steiner sy...
The interaction between geometry and algebra is a diverse and fruitful area to explore. Of particula...
Includes bibliography.281 p ; 30 cm.Title page, contents and abstract only. The complete thesis in p...
summary:A combinatorial characterization of finite projective planes using strongly canonical forms ...
AbstractA linear representation (LR) of a projective plane π (Desarguesian or not) is an isomorphic ...
AbstractWe define and study algebraically flat algebras in order to have a better understanding of a...
Let Γ be a rank three incidence geometry of points, lines and planes whose planes are linear spaces ...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
In this thesis we answer two questions relating to numerical invariants of rings and modules. In par...
AbstractIn this paper linear sets of finite projective spaces are studied and the “dual” of a linear...
AbstractSemiadditive rings are defined and their relationship with the projective planes is studied....
Apart from being an interesting and exciting area in combinatorics with beautiful results, finite pr...
From a projective plane Π with involutory homology τ one constructs an incidence system Π/τ having a...
Ziel dieser Arbeit ist eine computerunterstützte Suche nach, bis auf Isomorphie, allen projektiven E...