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    Convergence in Comparable Almost Periodic Reaction-Diffusion Systems with Dirichlet Boundary Condition

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    The paper is to study the asymptotic dynamics in nonmonotone comparable almost periodic reaction-diffusion system with Dirichlet boundary condition, which is comparable with uniformly stable strongly order-preserving system. By appealing to the theory of skew-product semiflows, we obtain the asymptotic almost periodicity of uniformly stable solutions to the comparable reaction-diffusion system

    A General Generalization of Jordan's Inequality and a Refinement of L. Yang's Inequality

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