Publication detail
Topological systems as a framework for institutions
Denniston Jeffrey, Melton Austin, Rodabaugh Stephen, Solovjovs Sergejs
English title
Topological systems as a framework for institutions
Type
journal article in Web of Science
Language
en
Original abstract
Recently, J. T. Denniston, A. Melton, and S. E. Rodabaugh introduced a lattice-valued analogue of the concept of institution of J. A. Goguen and R. M. Burstall, comparing it, moreover, with the (lattice-valued version of the) notion of topological system of S. Vickers. In this paper, we show that a suitable generalization of topological systems provides a convenient framework for certain kinds of (lattice-valued) institutions.
English abstract
Recently, J. T. Denniston, A. Melton, and S. E. Rodabaugh introduced a lattice-valued analogue of the concept of institution of J. A. Goguen and R. M. Burstall, comparing it, moreover, with the (lattice-valued version of the) notion of topological system of S. Vickers. In this paper, we show that a suitable generalization of topological systems provides a convenient framework for certain kinds of (lattice-valued) institutions.
Keywords in English
Adjoint situation; Affine theory; Comma category; Elementary institution; Localification and spatialization procedure; Topological institution; Topological space; Topological system; Variety of algebras
Released
01.09.2016
Publisher
ELSEVIER SCIENCE BV
Location
NETHERLANDS
ISSN
0165-0114
Volume
298
Number
1
Pages from–to
91–108
Pages count
17
BIBTEX
@article{BUT126463,
author="Sergejs {Solovjovs},
title="Topological systems as a framework for institutions",
year="2016",
volume=" 298",
number="1",
month="September",
pages="91--108",
publisher="ELSEVIER SCIENCE BV",
address="NETHERLANDS",
issn="0165-0114"
}