We consider optimal scalar quantization with $r$th power distortion and constrained R\'enyi entropy of order $\alpha$. For sources with absolutely continuous distributions the high rate asymptotics of the quantizer distortion has long been known for $\alpha=0$ (fixed-rate quantization) and $\alpha=1$ (entropy-constrained quantization). These results have recently been extended to quantization with R\'enyi entropy constraint of order $\alpha \ge r+1$. Here we consider the more challenging case $\alpha\in [-\infty,0)\cup (0,1)$ and for a large class of absolutely continuous source distributions we determine the sharp asymptotics of the optimal quantization distortion. The achievability proof is based on finding (asymptotically) optimal quanti...
This correspondence analyzes the low-resolution performance of entropy-constrained scalar quantizati...
We consider the compression of a continuous real-valued source X using scalar quantizers and average...
Communication of quantized information is frequently followed by a computation. We consider situatio...
Properties of scalar quantization with $r$th power distortion and constrained R\'enyi entropy of ord...
The nonnegativity of relative entropy implies that the differential entropy of a random vector X wi...
We establish the optimal quantization problem for probabilities under constrained Rényi-α-entropy of...
The distortion-rate performance of certain randomly-designed scalar quantizers is determined. The ce...
This paper considers the entropy of highly correlated quantized samples. Two results are shown. The ...
We consider the compression of a continuous real-valued source X using scalar quantizers and average...
In this paper, we build multiresolution source codes using entropy constrained dithered scalar quant...
The aim of this research is to investigate source coding, the representation of information source o...
The aim of this research is to investigate source coding, the representation of information source o...
Communication of quantized information is frequently followed by a computation. We consider situatio...
International audienceUsing high-rate theory approximations we introduce flexible practical quantize...
This correspondence analyzes the low-resolution performance of entropy-constrained scalar quantizati...
We consider the compression of a continuous real-valued source X using scalar quantizers and average...
Communication of quantized information is frequently followed by a computation. We consider situatio...
Properties of scalar quantization with $r$th power distortion and constrained R\'enyi entropy of ord...
The nonnegativity of relative entropy implies that the differential entropy of a random vector X wi...
We establish the optimal quantization problem for probabilities under constrained Rényi-α-entropy of...
The distortion-rate performance of certain randomly-designed scalar quantizers is determined. The ce...
This paper considers the entropy of highly correlated quantized samples. Two results are shown. The ...
We consider the compression of a continuous real-valued source X using scalar quantizers and average...
In this paper, we build multiresolution source codes using entropy constrained dithered scalar quant...
The aim of this research is to investigate source coding, the representation of information source o...
The aim of this research is to investigate source coding, the representation of information source o...
Communication of quantized information is frequently followed by a computation. We consider situatio...
International audienceUsing high-rate theory approximations we introduce flexible practical quantize...
This correspondence analyzes the low-resolution performance of entropy-constrained scalar quantizati...
We consider the compression of a continuous real-valued source X using scalar quantizers and average...
Communication of quantized information is frequently followed by a computation. We consider situatio...