On alternative quantization for doubly weighted approximation and integration over unbounded domains

Abstract

It is known that for a -weighted Lq-approximation of single variable functions f with the rth derivatives in a -weighted Lp space, the minimal error of approximations that use n samples of f is proportional to \|ω1/α\|L1α\|f(r)\|Lpn-r+(1/p-1/q)+, where ω=/ and α=r-1/p+1/q. Moreover, the optimal sample points are determined by quantiles of ω1/α. In this paper, we show how the error of best approximations changes when the sample points are determined by a quantizer other than ω. Our results can be applied in situations when an alternative quantizer has to be used because ω is not known exactly or is too complicated to handle computationally. The results for q=1 are also applicable to -weighted integration over unbounded domains.