Self-similar sets with initial cubic patterns

For A subset of {0, ..., n - 1}(m), let E(A) be the unique nonempty compact subset of R(m) such that E(A) = boolean OR(a is an element of A) (1/nE(A) + a/n). We show that two such self-similar sets E(A) and E(B) (for A, B subset of {0, ..., n - 1}(m)), supposed to be totally disconnected, are Lipschitz equivalent if and only if #A = #B. (C) 2009 Academie des sciences. Published by Elsevier Masson SAS. All rights reserved.