On regular languages over power sets
Keywords:
SemanticsAbstract
The power set of a finite set is used as the alphabet of a
string interpreting a sentence of Monadic Second-Order Logic so that
the string can be reduced (in a straightforward way) to the symbols
occurring in the sentence. Simple extensions to regular expressions
are described matching the succinctness of Monadic Second-Order
Logic. A link to Goguen and Burstall’s notion of an institution is
forged, and applied to conceptions within natural language semantics
of time based on change.
DOI:
https://doi.org/10.15398/jlm.v4i1.103Full article
Published
2016-04-13
How to Cite
Fernando, T. (2016). On regular languages over power sets. Journal of Language Modelling, 4(1), 29–56. https://doi.org/10.15398/jlm.v4i1.103
Issue
Section
Articles
License
Copyright (c) 2016 Tim Fernando
This work is licensed under a Creative Commons Attribution 3.0 Unported License.
