In approximation theory there are many classical and basic results on how well functions in certain function spaces (say smooth functions) can be approximated by elements from finite-dimensional subspaces (say e.g. splines; such an approximation is the simplest form of a numerical discretization). However, if the function to be approximated maps into a nonlinear manifold, what would be the corresponding discrete approximations, how does one compute them, and how does one show their approximation properties? There are several possibilities, and I will discuss one or two exemplary ones (most likely cubic spline curves).
Angelegt am Friday, 16.04.2021 14:21 von Sebastian Throm
Geändert am Wednesday, 16.06.2021 13:47 von Sebastian Throm
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