Conditioning of incoherent sub-dictionaries sampled from a coherent dictionary

Abstract

Motivated by the desire to find a realistic and stable random model for d-dimensional signals, that are sparse in a transform-based and thus often coherent frame, such as a wavelet or a Gabor frame, we study the conditioning of incoherent sub-dictionaries sampled from a coherent dictionary, such as a unit norm frame. In particular, we show that if the sub-dictionary is selected via a coherence rejective Poisson sampling model, it is well-conditioned with high probability, as long as its expected size scales as d/ (K), where K is the number of dictionary elements. The result is proved for the more general case of sampling quadratic sub-matrices from a real but not necessarily symmetric K× K matrix with zero diagonal, where coherence rejective sampling is defined via a symmetric mask, that acts as coherence substitute.