Midpoints for fuzzy sets and their application in medicine

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摘要

Using Kosko’s hypercube, we identify a fuzzy set with a point in a unit hypercube. A non-fuzzy or crisp subset of a set is a vertex of the hypercube. We introduce some new ideas: the definition of the fuzzy segment joining two given fuzzy subsets of a set, the set of midpoints between those two fuzzy subsets, and the set of equidistant points from given points. We present some basic properties and relations between these concepts and provide a complete description of fuzzy segments and midpoints. In the majority of cases, there is no unique midpoint; one has an infinite set of possibilities to choose from. This situation is totally different from classical Euclidean geometry where, for two given points, there is a unique midpoint. We use the obtained results to study two sets of medical data and present two applications in medicine: the fuzzy degree of two concurrent food and drug addictions, and a fuzzy representation of concomitant causal mechanisms of stroke.

论文关键词:Fuzzy set,Kosko’s hypercube,Hamming distance,Fuzzy midpoint,Fuzzy segment,Medical applications,Addiction,Stroke

论文评审过程:Received 30 November 2001, Revised 25 April 2002, Accepted 16 May 2002, Available online 15 October 2002.

论文官网地址:https://doi.org/10.1016/S0933-3657(02)00080-5