On some non-linear projections of self-similar sets in R3

Abstract

In the last years considerable attention has been paid for the orthogonal and non-linear projections of self-similar sets. In this paper we consider orthogonal transformation-free self-similar sets in R3, i.e. the generating IFS has the form \ λi x + ti \i=1q. We show that if the dimension of the set is strictly bigger than 1 then the projection of the set under some non-linear functions onto the real line has dimension 1. As an application, we show that the distance set of such self-similar sets has dimension 1. Moreover, the third algebraic product of a self-similar set with itself on the real line has dimension 1 if its dimension is at least 1/3.