On Refinable Sets

A refinable set is a compact set with positive Lebesgue measure whose characteristic function satisfies a refinement equation. Refinable sets are a generalization of self-affine tiles. But unlike the latter, the refinement equations defining refinable sets may have negative coefficients, and a refinable set may not tile. In this paper, we establish some fundamental properties of these sets.

Keywords

Hausdorff dimension, self-similar set, finite type condition

2010 Mathematics Subject Classification

28A78, 28A80

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Published 1 January 2007