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This article concerns the asymptotic behavior of solutions for a class of nonclassical diffusion equation with time-dependent perturbation coefficient and degenerate memory. We prove the existence and uniqueness of time-dependent global attractors in the family of time-dependent product spaces, by applying the operator decomposition technique and the contractive function method. Then we study the asymptotic structure of time-dependent global attractors as \ (t \). It is worth noting that the memory kernel function satisfies general assumption, and the nonlinearity \ (f\) satisfies a polynomial growth of arbitrary order. For more information see https: //ejde. math. txstate. edu/Volumes/2024/22/abstr. html
Zhang et al. (Tue,) studied this question.