Spectral Eigen-subspace and Tree Structure for a Cantor Measure

Abstract: In this work we investigate the question of constructions of the possible Fourier bases $E(\Lambda)={e^{2\pi i \lambda x}:\lambda\in\Lambda}$ for the Hilbert space $L^2(\mu_4)$, where $\mu_4$ is the standard middle-fourth Cantor measure and $\Lambda$ is a countable discrete set. We show that the set $$\mathop \bigcap_{p\in 2\Z+1}\left{\Lambda\subset \R: \text{$E(\Lambda)$ and $E(p\Lambda)$ are Fourier bases for $L^2(\mu_4)$}\right}$$ has the cardinality of the continuum. We also give other characterizations on the orthonormal set of exponential functions being a basis for the space $L^2(\mu_4)$ from the viewpoint of measure and dimension. Moreover, we provide a method of constructing explicit discrete set $\Lambda$ such that $E(\Lambda)$ and its all odd scaling sets $E(\Lambda),p\in2\Z+1,$ are still Fourier bases for $L^2(\mu_4)$.