Pointwise H\"older Exponents of the Complex Analogues of the Takagi Function in Random Complex Dynamics

We investigate the H\"older regularity of the function $T$ of the probability of tending to one minimal set, the partial derivatives of $T$ with respect to the probability parameters, which can be regarded as complex analogues of the Takagi function, and the higher partial derivatives $C$ of $T.$ Our main result gives a dynamical description of the pointwise H\"older exponents of $T$ and $C$, which allows us to determine the spectrum of pointwise H\"older exponents by employing the multifractal formalism in ergodic theory. Also, we prove that the bottom of the spectrum $\alpha_{-}$ is strictly less than $1$, which allows us to show that the averaged system acts chaotically on the Banach space $C^{\alpha }$ of $\alpha $- H\"older continuous functions for every $\alpha \in (\alpha_{-},1)$, though the averaged system behaves very mildly (e.g. we have spectral gaps) on $C^{\beta }$ for small $\beta >0.$