Constrained quantization for the Cantor distribution
Megha Pandey
Indian Institute of Technology (Banaras Hindu University), Varanasi, IndiaMrinal Kanti Roychowdhury
University of Texas Rio Grande Valley, Edinburg, USA
Abstract
The theory of constrained quantization has been recently introduced by Pandey and Roychowdhury. In this paper, they have further generalized their previous definition of constrained quantization and studied the constrained quantization for the classical Cantor distribution. Toward this, they have calculated the optimal sets of -points, th constrained quantization errors, the constrained quantization dimensions, and the constrained quantization coefficients, taking different families of constraints for all . The results in this paper show that both the constrained quantization dimension and the constrained quantization coefficient for the Cantor distribution depend on the underlying constraints. It also shows that the constrained quantization coefficient for the Cantor distribution can exist and be equal to the constrained quantization dimension. These facts are not true in the unconstrained quantization for the Cantor distribution.
Cite this article
Megha Pandey, Mrinal Kanti Roychowdhury, Constrained quantization for the Cantor distribution. J. Fractal Geom. 11 (2024), no. 3/4, pp. 319–341
DOI 10.4171/JFG/147