Varieties of De Morgan Monoids

Show simple item record

dc.contributor.advisor Raftery, James G.
dc.contributor.coadvisor Moraschini, Tommaso
dc.contributor.postgraduate Wannenburg, Johann Joubert
dc.date.accessioned 2020-07-13T13:55:46Z
dc.date.available 2020-07-13T13:55:46Z
dc.date.created 2020-09-01
dc.date.issued 2020
dc.description Thesis (PhD)--University of Pretoria, 2020. en_ZA
dc.description.abstract De Morgan monoids are algebraic structures that model certain non-classical logics. The variety DMM of all De Morgan monoids models the relevance logic Rt (so-named because it blocks the derivation of true conclusions from irrelevant premises). The so-called subvarieties and subquasivarieties of DMM model the strengthenings of Rt by new logical axioms, or new inference rules, respectively. Meta-logical problems concerning these stronger systems amount to structural problems about (classes of) De Morgan monoids, and the methods of universal algebra can be exploited to solve them. Until now, this strategy was under-developed in the case of Rt and DMM. The thesis contributes in several ways to the filling of this gap. First, a new structure theorem for irreducible De Morgan monoids is proved; it leads to representation theorems for the algebras in several interesting subvarieties of DMM. These in turn help us to analyse the lower part of the lattice of all subvarieties of DMM. This lattice has four atoms, i.e., DMM has just four minimal subvarieties. We describe in detail the second layer of this lattice, i.e., the covers of the four atoms. Within certain subvarieties of DMM, our description amounts to an explicit list of all the covers. We also prove that there are just 68 minimal quasivarieties of De Morgan monoids. Thereafter, we use these insights to identify strengthenings of Rt with certain desirable meta-logical features. In each case, we work with the algebraic counterpart of a meta-logical property. For example, we identify precisely the varieties of De Morgan monoids having the joint embedding property (any two nontrivial members both embed into some third member), and we establish convenient sufficient conditions for epimorphisms to be surjective in a subvariety of DMM. The joint embedding property means that the corresponding logic is determined by a single set of truth tables. Epimorphisms are related to 'implicit definitions'. (For instance, in a ring, the multiplicative inverse of an element is implicitly defined, because it is either uniquely determined or non-existent.) The logical meaning of epimorphism-surjectivity is, roughly speaking, that suitable implicit definitions can be made explicit in the corresponding logical syntax. en_ZA
dc.description.availability Unrestricted en_ZA
dc.description.degree PhD en_ZA
dc.description.department Mathematics and Applied Mathematics en_ZA
dc.description.sponsorship DST-NRF Centre of Excellence in Mathematical and Statistical Sciences (CoE-MaSS) en_ZA
dc.identifier.citation Wannenburg, JJ 2020, Varieties of De Morgan Monoids, PhD Thesis, University of Pretoria, Pretoria, viewed yymmdd <http://hdl.handle.net/2263/75178> en_ZA
dc.identifier.other S2020 en_ZA
dc.identifier.uri http://hdl.handle.net/2263/75178
dc.language.iso en en_ZA
dc.publisher University of Pretoria
dc.rights © 2019 University of Pretoria. All rights reserved. The copyright in this work vests in the University of Pretoria. No part of this work may be reproduced or transmitted in any form or by any means, without the prior written permission of the University of Pretoria.
dc.subject Abstract algebraic logic en_ZA
dc.subject De Morgan monoids en_ZA
dc.subject Relevance logic en_ZA
dc.subject Universal algebra en_ZA
dc.subject Beth property en_ZA
dc.subject UCTD
dc.title Varieties of De Morgan Monoids en_ZA
dc.type Thesis en_ZA


Files in this item

This item appears in the following Collection(s)

Show simple item record