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Insieme sfocato ${\displaystyle {\tilde {A}}}$ e funzione di appartenenza ${\displaystyle \mu _{\displaystyle {\tilde {A}}}(x)}$

Scegliamo - come formalismo - di rappresentare un insieme sfocato con la 'tilde':${\displaystyle {\tilde {A}}}$. Un insieme fuzzy è un insieme in cui gli elementi hanno un 'grado' di appartenenza (coerente con la logica fuzzy): alcuni possono essere inclusi nell'insieme al 100%, altri in percentuali inferiori.

A rappresentare matematicamente questo grado di appartenenza è la funzione ${\displaystyle \mu _{\displaystyle {\tilde {A}}}(x)}$ chiamata 'Funzione di appartenenza'. La funzione ${\displaystyle \mu _{\displaystyle {\tilde {A}}}(x)}$ è una funzione continua definita nell'intervallo ${\displaystyle [0;1]}$ dove:

• ${\displaystyle \mu _{\tilde {A}}(x)=1\rightarrow }$ se ${\displaystyle x}$ è totalmente contenuta in ${\displaystyle A}$ (questi punti sono chiamati 'nucleus', essi indicano i valori plausibili del predicato ).
• ${\displaystyle \mu _{\tilde {A}}(x)=0\rightarrow }$ se ${\displaystyle x}$ non è contenuto in ${\displaystyle A}$
• ${\displaystyle 0<\mu _{\tilde {A}}(x)<1\;\rightarrow }$ se ${\displaystyle x}$ è parzialmente contenuto in ${\displaystyle A}$ (questi punti sono chiamati 'Support' ed indicano i valori possibili del predicato possible predicate values).

La rappresentazione grafica della funzione ${\displaystyle \mu _{\displaystyle {\tilde {A}}}(x)}$ può essere variato; da quelli con linee lineari (triangolari, trapezoidali) a quelli a forma di campana o 'S' (sigmoidale) come rappresentato in Figura 1, che racchiude l'intero concetto grafico della funzione di appartenenza.^[1][2]

Figure 1: Types of graphs for the membership function.

The support set of a fuzzy set is defined as the zone in which the degree of membership results ${\displaystyle 0<\mu _{\tilde {A}}(x)<1}$; on the other hand, the core is defined as the area in which the degree of belonging assumes value ${\displaystyle \mu _{\tilde {A}}(x)=1}$

The 'Support set' represents the values of the predicate deemed possible, while the 'core' represents those deemed more plausible.

If ${\displaystyle {A}}$ represented a set in the ordinary sense of the term or classical language logic previously described, its membership function could assume only the values ${\displaystyle 1}$ or ${\displaystyle 0}$, ${\displaystyle \mu _{\displaystyle {A}}(x)=1\;\lor \;\mu _{\displaystyle {A}}(x)=0}$ depending on whether the element ${\displaystyle x}$ belongs to the whole or not, as considered. Figure 2 shows a graphic representation of the crisp (rigidly defined) or fuzzy concept of membership, which clearly recalls Smuts's considerations.^[3]

Let us go back to the specific case of our Mary Poppins, in which we see a discrepancy between the assertions of the dentist and the neurologist and we look for a comparison between classical logic and fuzzy logic:

Figure 2: Representation of the comparison between a classical and fuzzy ensemble.

Figure 2: Let us imagine the Science Universe ${\displaystyle U}$ in which there are two parallel worlds or contexts, ${\displaystyle {A}}$ and ${\displaystyle {\tilde {A}}}$.

${\displaystyle {A}=}$ In the scientific context, the so-called ‘crisp’, and we have converted into the logic of Classic Language, in which the physician has an absolute scientific background information ${\displaystyle KB}$ with a clear dividing line that we have named ${\displaystyle KB_{c}}$.

${\displaystyle {\tilde {A}}=}$ In another scientific context called ‘fuzzy logic’, and in which there is a union between the subset ${\displaystyle {A}}$ in ${\displaystyle {\tilde {A}}}$ that we can go so far as to say: union between ${\displaystyle KB_{c}}$.

We will remarkably notice the following deductions:

• Classical Logic in the Dental Context ${\displaystyle {A}}$ in which only a logical process that gives as results ${\displaystyle \mu _{\displaystyle {A}}(x)=1}$ will be possible, or ${\displaystyle \mu _{\displaystyle {A}}(x)=0}$ being the range of data ${\displaystyle D=\{\delta _{1},\dots ,\delta _{4}\}}$ reduced to basic knowledge ${\displaystyle KB}$ in the set ${\displaystyle {A}}$. This means that outside the dental world there is a void and that term of set theory is written precisely ${\displaystyle \mu _{\displaystyle {A}}(x)=0}$ and which is synonymous with a high range of:

• Fuzzy logic in a dental context ${\displaystyle {\tilde {A}}}$ in which they are represented beyond the basic knowledge ${\displaystyle KB}$ of the dental context also those partially acquired from the neurophysiological world ${\displaystyle 0<\mu _{\tilde {A}}(x)<1}$ will have the prerogative to return a result ${\displaystyle \mu _{\tilde {A}}(x)=1}$ and a result ${\displaystyle 0<\mu _{\tilde {A}}(x)<1}$ because of basic knowledge ${\displaystyle KB}$ which at this point is represented by the union of ${\displaystyle KB_{c}}$ dental and neurological contexts. The result of this scientific-clinical implementation of dentistry would allow a
  «Reduction of differential diagnostic error»