Root-Exponential Accuracy for Coarse Quantization of Finite Frame Expansions

Abstract: In this note, we show that by quantizing the N -dimensional frame coefficients of signals in R d using r-thorder Sigma-Delta quantization schemes, it is possible to achieve root-exponential accuracy in the oversampling rateIn particular, we construct a family of finite frames tailored specifically for coarse Sigma-Delta quantization that admit themselves as both canonical duals and Sobolev duals. Our construction allows for error guarantees that behave as e −c √ λ , where under a mild restriction on the oversa… Show more

“…Finally, it is important to note that stable r th -order Σ∆ schemes with C ρ,Q (r) = O(r r ) do indeed exist (see, e.g., [14,9]), even when A is a 1-bit alphabet. In particular, we cite the following proposition (see [21]). Proposition 1.…”

“…While the above results progressively improved on the coding efficiency of Σ∆ quantization, it remains true that even the root-exponential performance e −c √ N d of [21,22] is generally sub-optimal from an information theoretic perspective, including in the case where X = B d . To be more precise, any quantization scheme tasked with encoding all possible points in B d to within -accuracy must produce outputs which, in the case of an optimal encoder, each correspond to a unique subset of the unit ball having radius at most .…”

“…Motivated by applications in compressed sensing, a similar result [16] was shown for random frames whose elements are Gaussian random variables. This was followed by the results of [21] and [22] showing that there exist (deterministic and random) frames for which higher order Σ∆ schemes yield approximation errors that behave like e , where c is a constant. Specifically, in [21,22] this root-exponential accuracy is achieved by carefully choosing the order of the scheme as a function of the oversampling rate N/d.…”

“…This was followed by the results of [21] and [22] showing that there exist (deterministic and random) frames for which higher order Σ∆ schemes yield approximation errors that behave like e , where c is a constant. Specifically, in [21,22] this root-exponential accuracy is achieved by carefully choosing the order of the scheme as a function of the oversampling rate N/d. For a more comprehensive review of Σ∆ schemes applied to finite frames, see [26].…”

“…In Section 3 we show that random subsampling of the discretely integrated Σ∆ bit-stream allows a linear decoder to achieve exponentially decaying reconstruction error, uniformly for all x ∈ B d . This result pertains to a particular choice of frames, the Sobolev self-dual frames [21], and is contingent on using 1st order Σ∆ schemes. In Section 4 we instead use a Bernoulli matrix for reducing the dimensionality of the integrated Σ∆-bit stream.…”

Near-Optimal Encoding for Sigma-Delta Quantization of Finite Frame Expansions

“…Finally, it is important to note that stable r th -order Σ∆ schemes with C ρ,Q (r) = O(r r ) do indeed exist (see, e.g., [14,9]), even when A is a 1-bit alphabet. In particular, we cite the following proposition (see [21]). Proposition 1.…”

“…While the above results progressively improved on the coding efficiency of Σ∆ quantization, it remains true that even the root-exponential performance e −c √ N d of [21,22] is generally sub-optimal from an information theoretic perspective, including in the case where X = B d . To be more precise, any quantization scheme tasked with encoding all possible points in B d to within -accuracy must produce outputs which, in the case of an optimal encoder, each correspond to a unique subset of the unit ball having radius at most .…”

“…Motivated by applications in compressed sensing, a similar result [16] was shown for random frames whose elements are Gaussian random variables. This was followed by the results of [21] and [22] showing that there exist (deterministic and random) frames for which higher order Σ∆ schemes yield approximation errors that behave like e , where c is a constant. Specifically, in [21,22] this root-exponential accuracy is achieved by carefully choosing the order of the scheme as a function of the oversampling rate N/d.…”

“…This was followed by the results of [21] and [22] showing that there exist (deterministic and random) frames for which higher order Σ∆ schemes yield approximation errors that behave like e , where c is a constant. Specifically, in [21,22] this root-exponential accuracy is achieved by carefully choosing the order of the scheme as a function of the oversampling rate N/d. For a more comprehensive review of Σ∆ schemes applied to finite frames, see [26].…”

“…In Section 3 we show that random subsampling of the discretely integrated Σ∆ bit-stream allows a linear decoder to achieve exponentially decaying reconstruction error, uniformly for all x ∈ B d . This result pertains to a particular choice of frames, the Sobolev self-dual frames [21], and is contingent on using 1st order Σ∆ schemes. In Section 4 we instead use a Bernoulli matrix for reducing the dimensionality of the integrated Σ∆-bit stream.…”

Near-Optimal Encoding for Sigma-Delta Quantization of Finite Frame Expansions

Fast Binary Embeddings and Quantized Compressed Sensing with Structured Matrices

Sigma Delta Quantization for Images