抛物型问题的时空多尺度方法

P. Ljung, R. Maier, A. Målqvist
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引用次数: 6

摘要

我们提出了一个时空多尺度方法的抛物模型问题的潜在系数,可能是高度振荡相对于空间和时间变量。该方法基于变分多尺度方法的框架,在时空公式的背景下计算微分算子的粗尺度表示,并通过辅助的时空校正函数进行充实。一旦计算,粗尺度表示允许我们有效地获得多个右侧的近似离散解。我们证明了一阶收敛性独立于系数的振荡尺度,并说明了时空校正如何在空间和时间上呈指数衰减,从而使相应的计算可以局部化。这种定位使我们能够在复杂性和内存方面定义一种实用且计算效率高的方法,为此我们提供了后验误差估计并给出了数值示例。
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A space-time multiscale method for parabolic problems
We present a space-time multiscale method for a parabolic model problem with an underlying coefficient that may be highly oscillatory with respect to both the spatial and the temporal variables. The method is based on the framework of the Variational Multiscale Method in the context of a space-time formulation and computes a coarse-scale representation of the differential operator that is enriched by auxiliary space-time corrector functions. Once computed, the coarse-scale representation allows us to efficiently obtain well-approximating discrete solutions for multiple right-hand sides. We prove first-order convergence independently of the oscillation scales in the coefficient and illustrate how the space-time correctors decay exponentially in both space and time, making it possible to localize the corresponding computations. This localization allows us to define a practical and computationally efficient method in terms of complexity and memory, for which we provide a posteriori error estimates and present numerical examples.
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