Abstract
As stated in the introduction of [45], “the mathematics of fuzzy sets is the mathematics of lattice-valued maps” and consequently, the mathematics of fuzzy sets lends itself to a variety of structures, both topological and algebraic. Closely related to the standardization of the mathematics of fuzzy sets begun in [45], this volume continues the work of [45] in topology as well as gives several important developments in algebraic structures not available when [45] was published. At the same time, the chapters of the present work are motivated in significant measure by the presentations, informal discussions, and roundtables of the Twentieth International Seminar on Fuzzy Set Theory, or Twentieth Linz Seminar, held in Linz, Austria, February 1999.
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Rodabaugh, S.E., Klement, E.P. (2003). Introduction. In: Rodabaugh, S.E., Klement, E.P. (eds) Topological and Algebraic Structures in Fuzzy Sets. Trends in Logic, vol 20. Springer, Dordrecht. https://doi.org/10.1007/978-94-017-0231-7_1
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