A NOTE ON THE APPROXIMATION OF PDES WITH UNBOUNDED COEFFICIENTS -- THE SPECIAL ONE-DIMENSIONAL CASE

International journal of pure and applied mathematics Pub Date : 2020-02-20 DOI:10.12732/IJAM.V33I1.11
F. F. G. ccalves, M. Grossinho, Eduardo Souza de Morais
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Abstract

Abstract: We consider the spatial approximation of the Cauchy problem for a linear uniformly parabolic PDE of second order, with nondivergent operator and unbounded timeand space-dependent coefficients, where equation’s free term and initial data are also allowed to grow. We concentrate on the special case where the PDE has one dimension in space. As in [10], we consider a suitable variational framework and approximate the PDE problem’s generalised solution in the spatial variable, with the use of finite-difference methods, but we obtain, for this case, consistency and convergence results sharper than the corresponding results obtained in [10] for the more general multidimensional case.
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关于系数无界偏微分方程近似的注记——一维的特殊情况
摘要考虑一类二阶线性均匀抛物型偏微分方程的空间逼近问题,该方程具有非发散算子和无界时空相关系数,其中方程的自由项和初始数据也允许增长。我们专注于PDE在空间中只有一维的特殊情况。正如在[10]中一样,我们考虑了一个合适的变分框架,并使用有限差分方法在空间变量中近似PDE问题的广义解,但在这种情况下,我们获得的一致性和收敛性结果比在[10]中获得的更一般的多维情况下的相应结果更清晰。
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International journal of pure and applied mathematics
International journal of pure and applied mathematics
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