On the Lq dimension of stationary measures for M\"obius iterated function systems

Abstract

We study the Lq dimension D(,q)\ (q>1) of stationary measures for M\"obius iterated function systems on R satisfying the strongly Diophantine condition, and try the extension of Shmerkin's result [Theorem 6.6]Shm19. As the result, we show that there is the dichotomy: the Lq spectrum τ(,q)=(q-1)D(,q) is equal to the desired value \τ(,q),q-1\ for any q>1, where τ(,q) is the zero of the canonical pressure function, or there exist q0>1 and 0<α<1 such that τ(,q)=\τ(,q),q-1\ for 1<q<q0 and τ(,q)=α q for q≥ q0. In addition, we give examples of M\"obius iterated function systems which show the latter case by giving an affirmative answer to Solomyak's question [Question 2]Sol24.