Fuzzy differential inclusion: Difference between revisions

Latest revision as of 06:31, 25 May 2024

Fuzzy differential inclusion is the extension of differential inclusion to fuzzy sets introduced by Lotfi A. Zadeh.^[1]^[2]

$x^{'} (t) \in [f (t, x (t))]^{α}$ with $x (0) \in [x_{0}]^{α}$

Suppose $f (t, x (t))$ is a fuzzy valued continuous function on Euclidean space. Then it is the collection of all normal, upper semi-continuous, convex, compactly supported fuzzy subsets of $ℝ^{n}$ .

Second order differential

The second order differential is

$x^{″} (t) \in [k x]^{α}$ where $k \in [K]^{α}$ , $K$ is trapezoidal fuzzy number $(- 1, - 1 / 2, 0, 1 / 2)$ , and $x_{0}$ is a trianglular fuzzy number (-1,0,1).

Applications

Fuzzy differential inclusion (FDI) has applications in

References

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Fuzzy differential inclusion: Difference between revisions

Latest revision as of 06:31, 25 May 2024

Second order differential

Applications

References

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