Khintchine dichotomy and Schmidt estimates for self-similar measures on Rd

Abstract

We extend the classical theorems of Khintchine and Schmidt in metric Diophantine approximation to the context of self-similar measures on Rd. For this, we establish effective equidistribution of associated random walks on SLd+1(R)/SLd+1(Z). This generalizes our previous work which requires d=1 and restricts Schmidt-type counting estimates to approximation functions which decay fast enough. Novel techniques include a bootstrap scheme for the associated random walks despite algebraic obstructions, and a refined treatment of Dani's correspondence. Along the way, we also establish non-concentration properties of self-similar measures near algebraic subvarieties of Rd.