Title of article
Tangled Closure Algebras
Author/Authors
Goldblatt ، Robert - Victoria University of Wellington , Hodkinson ، Ian - Imperial College London, South Kensington Campus
Pages
23
From page
9
To page
31
Abstract
The tangled closure of a collection of subsets of a topological space is the largest subset in which each member of the collection is dense. This operation models a logical ‘tangle modality’ connective, of significance in finite model theory. Here we study an abstract equational algebraic formulation of the operation which generalises the McKinsey-Tarski theory of closure algebras. We show that any dissectable tangled closure algebra, such as the algebra of subsets of any metric space without isolated points, contains copies of every finite tangled closure algebra. We then exhibit an example of a tangled closure algebra that cannot be embedded into any complete tangled closure algebra, so it has no MacNeille completion and no spatial representation.
Keywords
Closure algebra , tangled closure , tangle modality , Fixed point , quasiorder , Alexandroff topology , denseinitself , dissectable , MacNeille completion
Journal title
Categories and General Algebraic Structures with Applications
Serial Year
2017
Journal title
Categories and General Algebraic Structures with Applications
Record number
2456436
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