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چکیده
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This work introduces a novel approach to analyzing a class of conformable fractional boundary value problems.
By employing a combination of standard and newly developed fixed-point theorems, we establish sufficient conditions for the existence and uniqueness of positive solutions. The proposed method offers several advantages over
traditional techniques, including its simplicity and computational efficiency. Moreover, we construct a sequence
of successive approximations that converge to the unique positive solution, providing a practical tool for numerical simulations. Our findings have significant implications for various fields, including physics, engineering, and
biology, where conformable fractional differential equations are used to model complex phenomena.
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