Difference between revisions of "Triangular norm"
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''t-norm'' | ''t-norm'' | ||
− | A binary operation on the unit interval | + | A [[binary operation]] on the unit interval $[0,1]$, i.e., a function $T : [0,1]^2 \rightarrow [0,1]$ such that for all $x,y,z \in [0,1]$ the following four axioms are satisfied: |
− | T1) (commutativity) | + | T1) (commutativity) $T(x,y) = T(y,x)$; |
− | T2) (associativity) | + | T2) (associativity) $T(x,T(y,z)) = T(T(x,y),z)$; |
− | T3) (monotonicity) | + | T3) (monotonicity) $T(x,y) \le T(x,z)$ whenever $y \le z$; |
− | T4) (boundary condition) | + | T4) (boundary condition) $T(x,1) = x$. |
− | If | + | If $T$ is a triangular norm, then its ''dual triangular co-norm'' $S$ is given by |
+ | $$ | ||
+ | S(x,y) = 1 - T(1-x,1-y) \ . | ||
+ | $$ | ||
− | + | A function $T : [0,1]^2 \rightarrow [0,1]$ is a triangular norm if and only if $([0,1], T, {\le})$ is a fully ordered commutative [[semi-group]] (cf. [[#References|[a3]]] and [[O-group|$o$-group]]) with neutral element $1$ and annihilator $0$, where ${\le}$ is the usual order on $[0,1]$. | |
− | + | For each $I$-semi-group $([a,b],{\star})$, i.e. a semi-group in which the binary associative operation $\star$ on the closed subinterval $[a,b]$ of the extended real line is continuous and one of the boundary points of $[a,b]$ acts as a neutral element and the other one as an annihilator ([[#References|[a6]]], [[#References|[a7]]]), there exists a continuous triangular norm $T$ or a continuous triangular co-norm $S$ such that the linear transformation $\phi : [a,b] \rightarrow [0,1]$ given by | |
− | + | $$ | |
− | + | \phi : x \mapsto \frac{x-a}{b-a} | |
− | + | $$ | |
− | + | is an [[Isomorphism|isomorphism]] between $([a,b],{\star})$ and either $([0,1],T)$ or $([0,1],S)$. | |
− | |||
− | is an [[Isomorphism|isomorphism]] between | ||
The following are the four basic triangular norms, together with their dual triangular co-norms: | The following are the four basic triangular norms, together with their dual triangular co-norms: | ||
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<TR><TD valign="top">[a9]</TD> <TD valign="top"> B. Schweizer, A. Sklar, "Probabilistic metric spaces" , North-Holland (1983)</TD></TR> | <TR><TD valign="top">[a9]</TD> <TD valign="top"> B. Schweizer, A. Sklar, "Probabilistic metric spaces" , North-Holland (1983)</TD></TR> | ||
</table> | </table> | ||
+ | |||
+ | {{TEX|part}} |
Revision as of 18:51, 27 December 2015
t-norm
A binary operation on the unit interval $[0,1]$, i.e., a function $T : [0,1]^2 \rightarrow [0,1]$ such that for all $x,y,z \in [0,1]$ the following four axioms are satisfied:
T1) (commutativity) $T(x,y) = T(y,x)$;
T2) (associativity) $T(x,T(y,z)) = T(T(x,y),z)$;
T3) (monotonicity) $T(x,y) \le T(x,z)$ whenever $y \le z$;
T4) (boundary condition) $T(x,1) = x$.
If $T$ is a triangular norm, then its dual triangular co-norm $S$ is given by $$ S(x,y) = 1 - T(1-x,1-y) \ . $$
A function $T : [0,1]^2 \rightarrow [0,1]$ is a triangular norm if and only if $([0,1], T, {\le})$ is a fully ordered commutative semi-group (cf. [a3] and $o$-group) with neutral element $1$ and annihilator $0$, where ${\le}$ is the usual order on $[0,1]$.
For each $I$-semi-group $([a,b],{\star})$, i.e. a semi-group in which the binary associative operation $\star$ on the closed subinterval $[a,b]$ of the extended real line is continuous and one of the boundary points of $[a,b]$ acts as a neutral element and the other one as an annihilator ([a6], [a7]), there exists a continuous triangular norm $T$ or a continuous triangular co-norm $S$ such that the linear transformation $\phi : [a,b] \rightarrow [0,1]$ given by $$ \phi : x \mapsto \frac{x-a}{b-a} $$ is an isomorphism between $([a,b],{\star})$ and either $([0,1],T)$ or $([0,1],S)$.
The following are the four basic triangular norms, together with their dual triangular co-norms:
i) the minimum and maximum , given by
ii) the product and probabilistic sum , given by
iii) the Lukasiewicz triangular norm and Lukasiewicz triangular co-norm , given by
iv) the weakest triangular norm (or drastic product) and strongest triangular co-norm , given by
Let be a family of triangular norms and let be a family of pairwise disjoint open subintervals of the unit interval (i.e., is an at most countable index set). Consider the linear transformations given by
Then the function defined by
is a triangular norm, which is called the ordinal sum of the summands , .
The following representations hold ([a1], [a5], [a6]):
A function is a continuous Archimedean triangular norm, i.e., for all one has , if and only if there exists a continuous, strictly decreasing function with such that for all ,
The function is then called an additive generator of ; it is uniquely determined by up to a positive multiplicative constant.
is a continuous triangular norm if and only if is an ordinal sum whose summands are continuous Archimedean triangular norms.
Triangular norms are applied in many fields, such as probabilistic metric spaces [a9], [a4], fuzzy sets, fuzzy logics and their applications [a4], the theory of generalized measures [a2], [a8], functional equations [a1] and in non-linear differential and difference equations (see [a4], [a8]).
References
[a1] | J. Aczél, "Lectures on functional equations and their applications" , Acad. Press (1969) |
[a2] | D. Butnariu, E.P. Klement, "Triangular norm-based measures and games with fuzzy coalitions" , Kluwer Acad. Publ. (1993) |
[a3] | L. Fuchs, "Partially ordered algebraic systems" , Pergamon (1963) Zbl 0137.02001 |
[a4] | E.P. Klement, R. Mesiar, E. Pap, "Triangular norms" Trends in Logic--Studia Logica Library 8 Kluwer Academic ISBN 0-7923-6416-3 Zbl 0972.03002 |
[a5] | C.M. Ling, "Representation of associative functions" Publ. Math. Debrecen , 12 (1965) pp. 189–212 |
[a6] | P.S. Mostert, A.L. Shields, "On the structure of semigroups on a compact manifold with boundary" Ann. of Math. , 65 (1957) pp. 117–143 |
[a7] | A.B. Paalman-de Miranda, "Topological semigroups" , Tracts , 11 , Math. Centre Amsterdam (1970) |
[a8] | E. Pap, "Null-additive set functions" , Kluwer Acad. Publ. &Ister Sci. (1995) |
[a9] | B. Schweizer, A. Sklar, "Probabilistic metric spaces" , North-Holland (1983) |
Triangular norm. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Triangular_norm&oldid=37117