Structural completeness in propositional logics of dependence. Iemhoff, R. & Yang, F. Archive for Mathematical Logic, 55(7):955–975, Springer, 2016. abstract bibtex In this paper we prove that three of the main propositional logics of dependence (including propositional dependence logic and inquisitive logic), none of which is structural, are structurally complete with respect to a class of substitutions under which the logics are closed. We obtain an analogous result with respect to stable substitutions, for the negative variants of some well-known intermediate logics, which are intermediate theories that are closely related to inquisitive logic.
@article{Iemhoff:16,
title={Structural completeness in propositional logics of dependence},
author={Iemhoff, Rosalie and Yang, Fan},
journal={Archive for Mathematical Logic},
volume={55},
number={7},
pages={955--975},
year={2016},
publisher={Springer},
keywords = {inquisitive logic},
abstract={In this paper we prove that three of the main propositional logics of dependence (including propositional dependence logic and inquisitive logic), none of which is structural, are structurally complete with respect to a class of substitutions under which the logics are closed. We obtain an analogous result with respect to stable substitutions, for the negative variants of some well-known intermediate logics, which are intermediate theories that are closely related to inquisitive logic.}
}
Downloads: 0
{"_id":"NdmvKGqJhLwSwofXe","bibbaseid":"iemhoff-yang-structuralcompletenessinpropositionallogicsofdependence-2016","author_short":["Iemhoff, R.","Yang, F."],"bibdata":{"bibtype":"article","type":"article","title":"Structural completeness in propositional logics of dependence","author":[{"propositions":[],"lastnames":["Iemhoff"],"firstnames":["Rosalie"],"suffixes":[]},{"propositions":[],"lastnames":["Yang"],"firstnames":["Fan"],"suffixes":[]}],"journal":"Archive for Mathematical Logic","volume":"55","number":"7","pages":"955–975","year":"2016","publisher":"Springer","keywords":"inquisitive logic","abstract":"In this paper we prove that three of the main propositional logics of dependence (including propositional dependence logic and inquisitive logic), none of which is structural, are structurally complete with respect to a class of substitutions under which the logics are closed. We obtain an analogous result with respect to stable substitutions, for the negative variants of some well-known intermediate logics, which are intermediate theories that are closely related to inquisitive logic.","bibtex":"@article{Iemhoff:16,\n title={Structural completeness in propositional logics of dependence},\n author={Iemhoff, Rosalie and Yang, Fan},\n journal={Archive for Mathematical Logic},\n volume={55},\n number={7},\n pages={955--975},\n year={2016},\n publisher={Springer},\n keywords = {inquisitive logic},\n abstract={In this paper we prove that three of the main propositional logics of dependence (including propositional dependence logic and inquisitive logic), none of which is structural, are structurally complete with respect to a class of substitutions under which the logics are closed. We obtain an analogous result with respect to stable substitutions, for the negative variants of some well-known intermediate logics, which are intermediate theories that are closely related to inquisitive logic.}\n }\n\n\n","author_short":["Iemhoff, R.","Yang, F."],"key":"Iemhoff:16","id":"Iemhoff:16","bibbaseid":"iemhoff-yang-structuralcompletenessinpropositionallogicsofdependence-2016","role":"author","urls":{},"keyword":["inquisitive logic"],"metadata":{"authorlinks":{}}},"bibtype":"article","biburl":"https://projects.illc.uva.nl/inquisitivesemantics/assets/files/papers.bib","dataSources":["LaLDs2mrYhQpgH6Lk"],"keywords":["inquisitive logic"],"search_terms":["structural","completeness","propositional","logics","dependence","iemhoff","yang"],"title":"Structural completeness in propositional logics of dependence","year":2016}