Involutions in fuzzy set theory.

Sergei V. Ovchinnikov

Stochastica (1980)

  • Volume: 4, Issue: 3, page 227-231
  • ISSN: 0210-7821

Abstract

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All possible involutions in fuzzy set theory are completely described. Any involution is a composition of a symmetry on a universe of fuzzy sets and an involution on a truth set.

How to cite

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Ovchinnikov, Sergei V.. "Involutions in fuzzy set theory.." Stochastica 4.3 (1980): 227-231. <http://eudml.org/doc/38823>.

@article{Ovchinnikov1980,
abstract = {All possible involutions in fuzzy set theory are completely described. Any involution is a composition of a symmetry on a universe of fuzzy sets and an involution on a truth set.},
author = {Ovchinnikov, Sergei V.},
journal = {Stochastica},
keywords = {Conjuntos difusos; Modelos matemáticos; negation; dual automorphisms of period two},
language = {eng},
number = {3},
pages = {227-231},
title = {Involutions in fuzzy set theory.},
url = {http://eudml.org/doc/38823},
volume = {4},
year = {1980},
}

TY - JOUR
AU - Ovchinnikov, Sergei V.
TI - Involutions in fuzzy set theory.
JO - Stochastica
PY - 1980
VL - 4
IS - 3
SP - 227
EP - 231
AB - All possible involutions in fuzzy set theory are completely described. Any involution is a composition of a symmetry on a universe of fuzzy sets and an involution on a truth set.
LA - eng
KW - Conjuntos difusos; Modelos matemáticos; negation; dual automorphisms of period two
UR - http://eudml.org/doc/38823
ER -

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