On the union of homogeneous symmetric Cantor set with its translations

Abstract

Fix a positive integer N and a real number 0< β < 1/(N+1). Let be the homogeneous symmetric Cantor set generated by the IFS \ φi(x)=β x + i 1-βN: i=0,1,·s, N \. For m∈Z+ we show that there exist infinitely many translation vectors t=(t0,t1,·s, tm) with 0=t0<t1<·s<tm such that the union j=0m(+tj) is a self-similar set. Furthermore, for 0< β < 1/(2N+1), we give a complete characterization on which the union j=0m(+tj) is a self-similar set. Our characterization relies on determining whether some related directed graph has no cycles, or whether some related adjacency matrix is nilpotent.