Membership function (mathematics)

The membership function of a fuzzy set is a generalization of the indicator function in classical sets. In fuzzy logic, it represents the degree of truth as an extension of valuation. Degrees of truth are often confused with probabilities, although they are conceptually distinct, because fuzzy truth represents membership in vaguely defined sets, not likelihood of some event or condition.

For the universe ${\displaystyle \mathrm {X} }$ and given the membership-degree function ${\displaystyle \mu \ \to [0,1]}$

the fuzzy set A is defined as

${\displaystyle {\tilde {\mathit {A}}}=\{(x,\mu _{A}(x))\mid x\in \mathbf {X} \}}$

The membership function ${\displaystyle \mu _{A}(x)}$ quantifies the grade of membership of the elements ${\displaystyle x}$ to the fundamental set ${\displaystyle \mathbf {X} }$. The value 0 means that the member is not included in the given set, 1 describes a fully included member. The values between 0 and 1 characterize fuzzy members.

The following holds for the functional values of the membership function ${\displaystyle \mu _{A}(x)}$

${\displaystyle \mu _{A}(x)\geq 0\quad \forall \quad x\in \mathbf {X} }$

${\displaystyle \sup _{x\in X}[\mu _{A}(x)]=1}$

• Defuzzification
• Fuzzy measure theory
• fuzzy set operations
• Rough set

• Fuzzy Image Processing