Fuzzy subset

Some set-theoretical notions for fuzzy subsets

In classical mathematics the definitions of union, intersection and complement are related with the interpretation of the basic logical connectives ${\displaystyle \vee ,\wedge ,\neg }$. In order to define the same operations for fuzzy subsets, we have to fix suitable operations ${\displaystyle \oplus ,\otimes }$ and ~ in L to interpret these connectives. Once this was done, we can set

${\displaystyle (s\cup t)(x)=s(x)\oplus t(x)}$,

${\displaystyle (s\cap t)(x)=s(x)\otimes t(x)}$,

${\displaystyle (-s)(x)=~s(x)}$.

In such a way an algebraic structure ${\displaystyle (L^{S},\cup ,\cap ,-,\emptyset ,S)}$ is defined and this structure is the direct power of the structure ${\displaystyle (L,\oplus ,\otimes ,}$ ~,0 ,1) with index set S. In Zadeh's original papers the operations ${\displaystyle \oplus ,\otimes }$, ~ are defined by setting for every x and y in [0,1]:

${\displaystyle x\otimes y}$ = min(x, y) ; ${\displaystyle x\oplus y}$ = max(x,y) ; ${\displaystyle ~x}$ = 1-x.

In such a case ${\displaystyle ([0,1]^{F},\cup ,\cap ,-,\emptyset ,S)}$ is a complete, completely distributive lattice with an involution. Several authors prefer to consider different operations, as an example to assume that ${\displaystyle \otimes }$ is a triangular norm in [0,1] and that ${\displaystyle \oplus }$ is the corresponding triangular co-norm.

In all the cases the interpretation of a logical connective is conservative in the sense that its restriction to {0,1} coincides with the classical one. This entails that the map associating any subset X of a set S with the related characteristic function is an embedding of the Boolean algebra ${\displaystyle (\{0,1\}^{S},\cup ,\cap ,-,\emptyset ,S)}$ into the algebra ${\displaystyle (L^{S},\cup ,\cap ,-,\emptyset ,S)}$.