Fuzzy linear system of the form $\tilde{A}_{1} X\Theta_{gH}\tilde{A}_{2} X=\tilde{b}$ | Zendy

Kh. Sabzi | Zendy; M.H. Afshar | Zendy; M. Keshavarz | Zendy

AI Assistant Blog Pricing

Home ZAIA Blog

Open Access

Fuzzy linear system of the form $\tilde{A}_{1} X\Theta_{gH}\tilde{A}_{2} X=\tilde{b}$

Author(s) -

Kh. Sabzi,

M.H. Afshar,

M. Keshavarz

Publication year - 2016

Publication title -

journal of fuzzy set valued analysis

Language(s) - English

Resource type - Journals

ISSN - 2193-4169

DOI - 10.5899/2016/jfsva-00279

Subject(s) - tilde , mathematics , combinatorics

In this paper, we shall propose a new method to obtain solutions of a fully fuzzy linear system (FFLS) based on concept of generalized Hakuhara difference. FFLS of the form $\tilde{A}_{1} X=\tilde{A}_{2} X+\tilde{b}$ is converted to $\tilde{A}_{1} X\Theta_{gH}\tilde{A}_{2} X=\tilde{b}$ that is solved by two kind of solutions. The first kind of FFLS $\tilde{A}_{1} X\Theta_{gH}\tilde{A}_{2} X=\tilde{b}$ is the same as the FFLS $(\tilde{A}_{1} + \tilde{A}_{2}) X=\tilde{b}$ will be the same. But in the latter the spread of solutions are higher in number

The content you want is available to Zendy users.

Already have an account? Click here to sign in.

Having issues? You can contact us here

Accelerating Research