Results 41 to 50 of about 94 (68)

Electrical Networks, Hyperplane Arrangements and Matroids [PDF]

open access: yes, 2019
This thesis introduces a class of hyperplane arrangements, called Dirichlet arrangements, arising from electrical networks with Dirichlet boundary conditions.
Lutz, Robert
core  

On The Class Of Factored Arrangements

open access: yes, 2016
The first main objective of the work was to create a combinatorial answer to an essential question; "How Terao generalization of the class of supersolvable arrangements preserved the tensor factorization of the O-S algebra?", by finding a relation among ...
M. Ali, Hana', Abd-Kareem, Hawra'a H.
core   +1 more source

Koszulity, supersolvability, and Stirling representations

open access: yes
Supersolvable hyperplane arrangements and matroids are known to give rise to certain Koszul algebras, namely their Orlik-Solomon algebras and graded Varchenko-Gel'fand algebras. We explore how this interacts with group actions, particularly for the braid
Reiner, Victor   +2 more
core   +1 more source

Lower central series and free resolutions of hyperplane arrangements

open access: yes, 2008
. If M is the complement of a hyperplane arrangement, and A = H ∗ (M, k) is the cohomology ring of M over a field of characteristic 0, then the ranks, φk, of the lower central series quotients of π1(M) can be computed from the Betti numbers, bii = dim ...
Alexander, I. Suciu, Henry K. Schenck
core  

Convex Geometry of Building Sets

open access: yes
Building sets were introduced in the study of wonderful compactifications of hyperplane arrangement complements and were later generalized to finite meet-semilattices. Convex geometries, the duals of antimatroids, offer a robust combinatorial abstraction
Backman, Spencer, Danner, Rick
core   +1 more source

Lower central series and free resolutions of hyperplane arrangements

open access: yes, 2002
If $M$ is the complement of a hyperplane arrangement, and $A=H^*(M,\k)$ is the cohomology ring of $M$ over a field of characteristic 0, then the ranks, $\phi_k$, of the lower central series quotients of $\pi_1(M)$ can be computed from the Betti numbers, $
Alexander I. Suciu, Henry K. Schenck
core  

Supersolvable posets and fiber-type arrangements

open access: yes
We develop a theory of modularity and supersolvability for chain-finite geometric posets, extending that of Stanley for finite lattices and building a new connection between combinatorics and topology.
Delucchi, Emanuele, Bibby, Christin
core  

Non-K(pi,1) arrangements

open access: yes
This thesis, supervised by Professor Filippo Gianluca Callegaro, addresses the problem of hyperplane arrangements that are not K(pi,1). I have analysed the following works: - The papers by Hattori (1976) and Salvetti (1987) on the non-asphericity of ...
TAVANO, MARCO
core  

On an explicit correspondence between nbc-basis, chambers and minimal complex for real supersolvable arrangements

open access: yesOn an explicit correspondence between nbc-basis, chambers and minimal complex for real supersolvable arrangements
In this paper we give a very natural description of the bijections between the set of cells in the minimal CW-complex homotopy equivalent to the complement of a complexified real supersolvable arrangement A, the nbc-basis of the Orlik-Solomon algebra associated to A and the set of chambers of A.
openaire  

On supersolvable and nearly supersolvable line arrangements [PDF]

open access: yesJournal of Algebraic Combinatorics, 2018
v.3, a version of the Slope Problem, valid over the real and the complex numbers as well, is obtained, see Thm. 1.1 and Thm.
Alexandru Dimca   +2 more
exaly   +4 more sources

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