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In this work, we investigate the influence of the convection term and the singular lower order term on the existence and regularity of solutions to the following parabolic problem: cases u t-div (M (x, t) u) =-div (uE (x, t) ) +fu^{}&in (0, T), \\ u (x, t) =0&on (0, T), \\ u (x, 0) =u₀ (x) &in, cases where >0, R^N\ (N>2) is a bounded smooth domain with 0, and f L^m ( (0, T) ) with m 1 is a non-negative function. The function u₀ is a non-negative function that belongs to the space L^ () such that, \ c_>0, u₀ c_ in. The main idea of this research explains the combined impact of the convection term and the singular lower order term on the existence and regularity of a solution to the above problem.
Ouardy et al. (Thu,) studied this question.
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