Abstract
In this paper, we give a survey of recent results in the dimension theory of dynamical systems, with emphasis on the dimension of repellers and hyperbolic sets and the dimension of invariant measures. In the case of conformal dynamics, the theory is completely well understood. However, it still lacks today a satisfactory general approach for the non-conformal case, although a number of interesting and nontrivial developments have been obtained. Indeed, we only well understand some particular non-conformal repellers, e.g., generalized Sierpinski carpets and average conformal repellers.
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