Abstract
The Karhunen-Loéve transform (KLT) is known to be optimal for high-rate transform coding of Gaussian vectors for both fixed-rate and variable-rate encoding. The KLT is also known to be suboptimal for some non-Gaussian models. This paper proves high-rate optimality of the KLT for variable-rate encoding of a broad class of non-Gaussian vectors: Gaussian vector-scale mixtures (GVSM), which extend the Gaussian scale mixture (GSM) model of natural signals. A key concavity property of the scalar GSM (same as the scalar GVSM) is derived to complete the proof. Optimality holds under a broad class of quadratic criteria, which include mean-squared error (MSE) as well as generalized f-divergence loss in estimation and binary classification systems. Finally, the theory is illustrated using two applications: signal estimation in multiplicative noise and joint optimization of classification/ reconstruction systems.
Original language | English (US) |
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Pages (from-to) | 4049-4067 |
Number of pages | 19 |
Journal | IEEE Transactions on Information Theory |
Volume | 52 |
Issue number | 9 |
DOIs | |
State | Published - Sep 2006 |
Keywords
- Chernoff distance
- Classification
- Estimation
- Gaussian scale mixture
- High-resolution quantization
- Karhunen-Loéve transform (KLT)
- Mean-squared error (MSE)
- Multiplicative noise
- Quadratic criterion
- f-divergence
ASJC Scopus subject areas
- Information Systems
- Computer Science Applications
- Library and Information Sciences