Optimal quantizers for Radon random vectors in a Banach space

Abstract

For every integer n and evrery positive real number r > 0 and a Radon random vector X with values in a Banach space E, let e\n,r(X,E) = inf(E (\a ∈ α || X-a ||r)1/r, where the infimum is taken over all subsets α of E with card(α) <= n (n-quantizers). We investigate the existence of optimal n-quantizers for this Lr-quantization propblem, derive their stationarity properties and establish for Lp-spaces E the pathwise regularity of stationary quantizers.

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