# On the O(n3) algorithm for checking the strong robustness of interval fuzzy matrices

@article{Plvka2012OnTO, title={On the O(n3) algorithm for checking the strong robustness of interval fuzzy matrices}, author={J{\'a}n Pl{\'a}vka}, journal={Discret. Appl. Math.}, year={2012}, volume={160}, pages={640-647} }

Strongly robust interval matrices over ( max , min ) -algebra (fuzzy matrices) are studied and strong robustness properties are proved, similar to those of classical fuzzy matrices. It is shown that a strong robustness of an interval fuzzy matrix is well-defined using the definition of classical strong robustness. Characterization of strong robustness of interval fuzzy matrices is presented and an O ( n 3 ) algorithm for checking the strong robustness of interval fuzzy matrices is described.

#### Topics from this paper.

#### Citations

##### Publications citing this paper.

SHOWING 1-5 OF 5 CITATIONS

## On an algorithm for testing T4 solvability of max-plus interval systems

VIEW 6 EXCERPTS

HIGHLY INFLUENCED

## Computing the greatest X-eigenvector of a matrix in max-min algebra

VIEW 3 EXCERPTS

CITES BACKGROUND

## On the weak robustness of fuzzy matrices

VIEW 2 EXCERPTS

CITES BACKGROUND

## An iterative algorithm for testing solvability of max-min interval systems

VIEW 2 EXCERPTS

CITES METHODS & BACKGROUND

## Robustness of Interval Toeplitz Matrices in Fuzzy Algebra

VIEW 1 EXCERPT

CITES BACKGROUND