Local limit theorems for random isometries of the plane

Abstract

We consider a random walk (YN)N≥ 0 on R2 generated by successively applying independent random isometries, drawn from a fixed measure μ, to the point 0. When the support of μ is finite and includes an irrational rotation satisfying a Diophantine condition, we establish a local central limit theorem (LCLT) for YN down to super-polynomially small scales. When μ includes rotations satisfying a further algebraic condition, we prove that a LCLT holds down to the scale (-cN1/3/( N)2). Due to group-theoretic obstructions, this is sharp for symmetric μ, up to the factor. Lastly for a special class of asymmetric μ, we obtain an LCLT down to the much finer scale (-cN1/2). The proofs relate the fine-scale distribution of YN to a question about the values of integer polynomials on the unit circle.