Dense analytic subspaces in fractal L²-spaces

We consider self-similar measures $\mu $ with support in the interval $0\leq x\leq 1$ which have the analytic functions $\left\{e^{i2\pi nx}:n=0,1,2,... \right\} $ span a dense subspace in $L^{2}(\mu) $. Depending on the fractal dimension of $\mu $, we identify subsets $P\subset \mathbb{N}_{0}=\{0,1,2,... \} $ such that the functions $\{e_{n}:n\in P\} $ form an orthonormal basis for $L^{2}(\mu) $. We also give a higher-dimensional affine construction leading to self-similar measures $\mu $ with support in $\mathbb{R}^{\nu}$. It is obtained from a given expansive $\nu $-by-$\nu $ matrix and a finite set of translation vectors, and we show that the corresponding $L^{2}(\mu) $ has an orthonormal basis of exponentials $e^{i2\pi \lambda \cdot x}$, indexed by vectors $\lambda $ in $\mathbb{R}^{\nu}$, provided certain geometric conditions (involving the Ruelle transfer operator) hold for the affine system.