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41	Complexity bounds for cylindrical cell decompositions of sub-Pfaffian sets Pericleous, Savvas January 2002 (has links) No description available. 512 Semialgebraic sets
42	A study of universal algebras in fuzzy set theory Murali, V January 1988 (has links) This thesis attempts a synthesis of two important and fast developing branches of mathematics, namely universal algebra and fuzzy set theory. Given an abstract algebra [X,F] where X is a non-empty set and F is a set of finitary operations on X, a fuzzy algebra [I×,F] is constructed by extending operations on X to that on I×, the set of fuzzy subsets of X (I denotes the unit interval), using Zadeh's extension principle. Homomorphisms between fuzzy algebras are defined and discussed. Fuzzy subalgebras of an algebra are defined to be elements of a fuzzy algebra which respect the extended algebra operations under inclusion of fuzzy subsets. The family of fuzzy subalgebras of an algebra is an algebraic closure system in I×. Thus the set of fuzzy subalgebras is a complete lattice. A fuzzy equivalence relation on a set is defined and a partition of such a relation into a class of fuzzy subsets is derived. Using these ideas, fuzzy functions between sets, fuzzy congruence relations, and fuzzy homomorphisms are defined. The kernels of fuzzy homomorphisms are proved to be fuzzy congruence relations, paving the way for the fuzzy isomorphism theorem. Finally, we sketch some ideas on free fuzzy subalgebras and polynomial algebras. In a nutshell, we can say that this thesis treats the central ideas of universal algebras, namely subalgebras, homomorphisms, equivalence and congruence relations, isomorphism theorems and free algebra in the fuzzy set theory setting Fuzzy sets Algebra, Universal
43	Aspects of fuzzy spaces with special reference to cardinality, dimension, and order-homomorphisms Lubczonok, Pawel January 1992 (has links) Aspects of fuzzy vector spaces and fuzzy groups are investigated, including linear independence, basis, dimension, group order, finitely generated groups and cyclic groups. It was necessary to consider cardinality of fuzzy sets and related issues, which included a question of ways in which to define functions between fuzzy sets. Among the results proved, are the additivity property of dimension for fuzzy vector spaces, Lagrange's Theorem for fuzzy groups ( the existing version of this theorem does not take fuzziness into account at all), a compactness property of finitely generated fuzzy groups and an extension of an earlier result on the order-homomorphisms. An open question is posed with regard to the existence of a basis for an arbitrary fuzzy vector space. Fuzzy sets Topological spaces
44	Case studies of equivalent fuzzy subgroups of finite abelian groups Ngcibi, Sakhile L January 2002 (has links) The broad goal is to classify all fuzzy subgroups of a given type of finite group. P.S. Das introduced the ntion of level subgroups to characterize fuzzy subgroups of finite grouops. The notion of equivalence of fuzzy subgroups which is used in this thesis was first introduced by Murali and Makamba. We use this equivalence to charterise fuzzy subgroups of inite Abelian groups (p-groups in particular) for a specified prime p. We characterize some crisp subgroups of p-groups and investigate some cases on equi valent fuzzy subgroups. Abelian groups Fuzzy sets
45	(L, M)-fuzzy topological spaces Matutu, Phethiwe Precious January 1992 (has links) The objective of this thesis is to develop certain aspects of the theory of (L,M)-fuzzy topological spaces, where L and M are complete lattices (with additional conditions when necessary). We obtain results which are to a large extent analogous to results given in a series of papers of Šostak (where L = M = [0,1]) but not necessarily with analogous proofs. Often, our generalizations require a variety of techniques from lattice theory e.g. from continuity or complete distributive lattices. Topological spaces Fuzzy sets
46	Sobriety of crisp and fuzzy topological spaces Jacot-Guillarmod, Paul January 2004 (has links) The objective of this thesis is a survey of crisp and fuzzy sober topological spaces. We begin by examining sobriety of crisp topological spaces. We then extend this to the L- topological case and obtain analogous results and characterizations to those of the crisp case. We then brie y examine semi-sobriety of (L;M)-topological spaces. Topological spaces Fuzzy sets
47	On Continuity of Functions Defined on Unrestricted Point Sets Wilson, Ural 08 1900 (has links) This thesis is concerned with an investigation of the generalizations of continuous real functions of a real variable. In particular, the relationship between uniform continuity and ordinary continuity is concerned. The concept of uniform continuity was first introduced by Heine about 1900. point sets Continuity. Functions.
48	(261, 105, 42) ABELIAN DIFFERENCE SETS DO NOT EXIST Hufford, James Robert, Jr. 07 May 2015 (has links) No description available. Mathematics Difference Sets
49	Quotient sets, homomorphic images and multipliers / Thirunavukkarasu, K. January 1983 (has links) No description available. Mathematics Multipliers Difference sets
50	Group divisible difference sets / Ko, Hai-Ping January 1978 (has links) No description available. Mathematics Difference sets

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