On the reconstruction of bandlimited signals from random samples quantized via noise-shaping

Abstract

Noise-shaping quantization techniques are widely used for converting bandlimited signals from the analog to the digital domain. They work by ``shaping" the quantization noise so that it falls close to the reconstruction operator's null space. We investigate the compatibility of two such schemes, specifically ΣΔ quantization and distributed noise-shaping quantization, with random samples of bandlimited functions. Suppose R>1 is a real number and assume that \xi\i=1m is a sequence of i.i.d random variables uniformly distributed on [-R,R], where R>R is appropriately chosen. We show that by using a noise-shaping quantizer to quantize the (randomly sign flipped) values of a real-valued π-bandlimited function f at \xi\i=1m, a function f can be reconstructed from these quantized values such that \|f-f\|L2[-R, R] decays with high probability as m and R increase. This decay holds uniformly over all bandlimited f. We emphasize that the sample points \xi\i=1m are completely random, that is, they have no predefined structure, which makes our findings the first of their kind.