Paper detail

Spectral asymptotics of Krein--Feller operators for weak Gibbs measures on self-conformal fractals with overlaps

We study the spectral dimensions and spectral asymptotics of Krein--Feller operators for weak Gibbs measures on self-conformal fractals with or without overlaps. We show that, restricted to the unit interval, the $L^{q}$-spectrum for every weak Gibbs measure $ρ$ with respect to a $\mathcal{C}^{1}$-IFS exists as a limit. Building on recent results of the authors, we can deduce that the spectral dimension with respect to a weak Gibbs measure exists and equals the fixed point of its $L^{q}$-spectrum. For an IFS satisfying the open set condition, it turns out that the spectral dimension equals the unique zero of the associated pressure function. Moreover, for a Gibbs measure with respect to a $\mathcal{C}^{1+γ}$-IFS under the open set condition, we are able to determine the asymptotics of the eigenvalue counting function.