Spectral Asymptotics of Laplacians Associated to One-Dimensional Iterated Function Systems with Overlaps

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Abstract

We set up a framework for computing the spectral dimension of a class of one-dimensional self-similar measures that are defined by iterated function systems with overlaps and satisfy a family of second-order self-similar identities. As applications of our result we obtain the spectral dimension of important measures such as the infinite Bernoulli convolution associated with the golden ratio and convolutions of Cantor-type measures. The main novelty of our result is that the iterated function systems we consider are not post-critically finite and do not satisfy the well-known open set condition.

Original languageAmerican English
JournalCanadian Journal of Mathematics
Volume63
DOIs
StatePublished - Feb 25 2011

Keywords

  • Fractal
  • Iterated function system with overlaps
  • Laplacian
  • Second-order self-similar identities
  • Self-similar measure
  • Spectral dimension

DC Disciplines

  • Education
  • Mathematics

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