We propose a novel nonlinear evolution model that integrates a Caputo time-fractional derivative with a variable exponent diffusion operator for image decomposition and noise removal. The Caputo derivative captures memory effects through a fractional order, while the spatially adaptive exponent allows the diffusion process to adjust locally to image features. From a theoretical perspective, we establish well--posedness results by proving existence and uniqueness of solutions via the Faedo--Galerkin method in variable exponent Sobolev spaces. We further show that our model preserves positivity, a key property for image processing applications. On the numerical side, extensive experiments on grayscale and medical images demonstrate the robustness of the method under high noise levels. The results highlight the influence of both the fractional order and the variable exponent, confirming that our approach achieves stronger noise reduction and better feature preservation than state-of-the-art techniques.

This work proposes a novel nonlinear parabolic equation with p(x)-growth conditions for image restoration and enhancement. Based on the generalized Lebesgue and Sobolev spaces with variable exponent, we demonstrate the well-posedness of the proposed model. As a first result, we prove the existence of a weak solution to our model when the reaction term is bounded by a suitable function. Secondly, we use the approximations method to establish the existence of a nonnegative weak SOLA solution (Solution Obtained as Limit of Approximations) to the proposed model. Finally, numerical experiments illustrate that the proposed model performs better for image enhancement and denoising.

We study a class of nonlinear periodic systems driven by general differential operators with variable exponent. We assume that the reactions contains p(x)-growth nonlinearities with respect to the gradients. By using Leray Schauder’s topological degree combined with the sub- and super-solutions method, we establish the existence and uniqueness results of weak periodic solutions to the studied systems.