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A partial differential equation approach to multidimensional extrapolation. (English) Zbl 1036.65002
Summary: A general methodology for multidimensional extrapolation is presented. The approach assumes a level set function exists which separates the region of known values from the region to be extrapolated. It is shown that arbitrary orders of polynomial extrapolation can be formulated by simply solving a series of linear partial differential equations. Examples of constant, linear and quadratic extrapolation are given.

MSC:
65B05 Extrapolation to the limit, deferred corrections
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