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A Study on Distributive Nearlattices

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dc.contributor.advisor Noor, A.S.A.
dc.contributor.author Rahman, Md.Bazlar
dc.date.accessioned 2022-09-20T07:24:08Z
dc.date.available 2022-09-20T07:24:08Z
dc.date.issued 1994
dc.identifier.uri http://rulrepository.ru.ac.bd/handle/123456789/862
dc.description This Thesis is Submitted to the Department of Mathematics, University of Rajshahi, Rajshahi, Bangladesh for The Degree of Doctor of Philosophy (PhD) en_US
dc.description.abstract This thesis studies the nature of distributive nearlattices. By a nearlattice S we will always mean a (lower) semilattice which· has the property that any two elements possessing a common upper bound,have a supremum, Cornish and Hickman in their paper [14],referred this property as the upper bound property, and a semilattice of this nature as a semilattice with the upper bound property. Cornish and Noor in [15] preferred to call these semilattices as nearlattices as the behaviour of such a semilattice is closer to that of a lattice than an ordiary semilattice, In this thesis we give several results on near lattices which certainly extend and generalize many results in lattice theory, In chapter 1 we discuss ideals, congruences and other results which are basic to this thesis. We include some characterizations of distributive and modular nearlattices, We generalize the separation properties given by M.H.Stone for distributive lattices. We also show that the set of prime ideals of a nearlattice Sis unordered if and only if Sis semiboolean. Chapter 2 discusses the skeletal congruences of a distributive near lattice. Skeletal congruences on distributive lattices have been studied extensively by Cornish in [ 11], Here we extend several results of Cornish for nearlattices. We also introduce the notion of disjunctive nearlattices, A distributive nearlattice S with O is called disjunctive if for O 􀀅a < b there is an element x ES such that x A a= 0 and O < x 􀀅 b, Then we give several characterizations of disjunctive nearlattices and semiboolean algebras using skeletal congruences, Finally we show that a distributive naerlattice is semiboolean if and only if 8 -----> ker8 is lattice isomorphism of Sc(S) onto KSc(S) whose inverse is the map .J ---> 8(J), In chapter 3, we discuss on normal and n-normal nearlattices, Normal lattices have been studied by several authors including Cornish [8] and Monteiro [34]; while n-normal lattices have been studied by Cornish [9] and Davey [16], In proving some of the results we have used Principle of Localization, which is an extension of lecture note of Dr. Noor on localization. This technique is very interesting and quite different from those of the previous authors, en_US
dc.language.iso en en_US
dc.publisher University of Rajshahi en_US
dc.relation.ispartofseries ;D1774
dc.subject Nearlattices en_US
dc.subject Mathematics en_US
dc.title A Study on Distributive Nearlattices en_US
dc.type Thesis en_US


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