
Functions in the Sobolev space with dominating mixed smoothness on an N-dimensional hyperrectangle can be uniquely represented in terms of their highest-order mixed derivative and suitable boundary values. This representation enables optimal polynomial approximation of such functions by projecting the boundary values onto polynomial subspaces.


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constructive-representation-of-functions-in-n-dimensional-sobolev-space-and-optimal-polynomial-approximation


Constructive Representation of Functions in N-Dimensional Sobolev Space and Optimal Polynomial Approximation
