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The lattice of flats of a boolean representable simplicial complex
Title
The lattice of flats of a boolean representable simplicial complex
Type
Article in International Scientific Journal
Year
2018
Authors
Margolis, S
(Author)
Other
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Rhodes, J
(Author)
Other
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Pedro V. Silva
(Author)
FCUP
Journal
Title:
International Journal of Algebra and ComputationImported from Authenticus
Search for Journal Publications
Vol. 28
Pages: 1677-1691
ISSN:
0218-1967
Publisher:
World Scientific
Indexing
Other information
Authenticus ID:
P-00P-P6V
Abstract (EN):
It is shown that the lattices of flats of boolean representable simplicial complexes are always atomistic, but semimodular if and only if the complex is a matroid. A canonical construction is introduced for arbitrary finite atomistic lattices, providing a characterization of the lattices of flats of boolean representable simplicial complexes and a decidability condition. We remark that every finite lattice occurs as the lattice of flats of some simplicial complex.
Language:
English
Type (Professor's evaluation):
Scientific
No. of pages:
15
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Page created on: 2024-11-06 at 14:49:02
Page created on: 2024-11-06 at 14:49:02