Megha Pandey, Mrinal Kanti Roychowdhury
Published 2023-12-05Version 1
In this article, we present the idea of conditional quantization for a Borel probability measure $P$ on a normed space $\mathbb R^k$. We introduce the concept of conditional quantization in both constrained and unconstrained scenarios, along with defining the conditional quantization errors, dimensions, and coefficients in each case. We then calculate these values for specific probability distributions. Additionally, we demonstrate that for a Borel probability measure, the lower and upper quantization dimensions and coefficients do not depend on the conditional set of the conditional quantization in both constrained and unconstrained quantization.
Conditional constrained and unconstrained quantization for a uniform distribution on a hexagon
Sensitive Random Variables are Dense in Every $L^{p}(\mathbb{R}, \mathscr{B}_{\mathbb{R}}, \mathbb{P})$
Quantization dimension for inhomogeneous bi-Lipschitz IFS
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