Solving fuzzy linear systems in Gaussian PDMF space

TL;DR

This paper develops a systematic method for solving fuzzy linear systems within Gaussian PDMF space, including semi-fuzzy and fully-fuzzy systems, using adapted Gaussian elimination and explicit solution forms.

Contribution

It introduces explicit solutions and Gaussian elimination techniques for fuzzy linear systems in Gaussian PDMF space, extending classical methods to fuzzy and uncertain data.

Findings

Explicit solutions for SFLS and FFLS in Gaussian-PDMF space.

Adapted Gaussian elimination method for fuzzy matrices.

Connection established between SFLS and FFLS solutions.

Abstract

We solve the fuzzy linear systems in a fuzzy number space $\mathcal{X}$, namely the Gaussian probability density membership function (Gaussian-PDMF) space. The fuzzy linear systems include two types: the semi-fuzzy linear system (SFLS) and the fully-fuzzy linear system (FFLS). First, we solve the SFLS $A \bm{\tilde{x}}= \bm{\tilde{b}}$, where $A\in \mathbb{R}^{m\times n}$ is a real-valued matrix, $\bm{\tilde{b}}$ is a fuzzy number vector, and $\bm{\tilde{x}}$ is the unknown fuzzy number vector. The elements of both $\bm{\tilde{b}}$ and $\bm{\tilde{x}}$ belong to $\mathcal{X}$. We present the Cramer's rule to calculate the solution with square matrix $A$ and find out that its solution set is a $5(n-R(A))$ dimensional affine space with $A\in \mathbb{R}^{m\times n}$ and $R(A)$ being the rank of $A$. The explicit form of the solution for RREF matrix $A$ is stated to ensure usability for modeling. Secondly, we solve the FFLS $\bm{\tilde{A}}\bm{\tilde{x}}=\bm{\tilde{b}}$, where $\bm{\tilde{A}}$ is a fuzzy matrix with all components in $\mathcal{X}$. We analyze its solution set and present the parametric form of solutions under the fuzzy RREF matrix. We then adapt Gaussian elimination method to fuzzy matrices and systems by restricting it to the unit group of ring $\mathcal{X}$, proving the equivalence of solution sets after elementary row operations. We also establish the connection between FFLS and SFLS by confining elements of $\bm{\tilde{A}}$ to a subset of $\mathcal{X}$ that forms a field. Two numerical examples are given to illustrated our method. All results in this paper are explicit since the Gaussian-PDMF space $\mathcal{X}$, to which the membership function of the fuzzy number belongs, possesses a complete algebraic structure. The proposed framework offers a systematical tool for solving the mathematical models using fuzzy linear systems with uncertainty and fuzziness.