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Quantization dimension for Gibbs-like measures on cookie-cutter sets

In this paper using Banach limit we have determined a Gibbs-like measure $μ_h$ supported by a cookie-cutter set $E$ which is generated by a single cookie-cutter mapping $f$. For such a measure $μ_h$ and $r\in (0, +\infty)$ we have shown that there exists a unique $κ_r \in (0, +\infty)$ such that $κ_r$ is the quantization dimension function of the probability measure $μ_h$, and established its functional relationship with the temperature function of the thermodynamic formalism. The temperature function is commonly used to perform the multifractal analysis, in our context of the measure $μ_h$. In addition, we have proved that the $κ_r$-dimensional lower quantization coefficient of order $r$ of the probability measure is positive.