The quantization for in-homogeneous self-similar measures with in-homogeneous open set condition

Abstract

Let (gi)i=1M be a family of contractive similitudes satisfying the open set condition. Let be a self-similar measure associated with (gi)i=1M. We study the quantization problem for the in-homogeneous self-similar measure μ associated with a condensation system ((fi)i=1N,(pi)i=0N,). Assuming a version of in-homogeneous open set condition for this system, we prove the existence of the quantization dimension for μ of order r∈(0,∞) and determine its exact value r. We give sufficient conditions for the r-dimensional upper and lower quantization coefficient to be positive or finite.