On intrinsic ergodicity of factors of Zd subshifts

Abstract

It is well-known that any Z subshift with the specification property has the property that every factor is intrinsically ergodic, i.e., every factor has a unique factor of maximal entropy. In recent work, other Z subshifts have been shown to possess this property as well, including β-shifts and a class of S-gap shifts. We give two results that show that the situation for Zd subshifts with d >1 is quite different. First, for any d>1, we show that any Zd subshift possessing a certain mixing property must have a factor with positive entropy which is not intrinsically ergodic. In particular, this shows that for d>1, Zd subshifts with specification cannot have all factors intrinsically ergodic. We also give an example of a Z2 shift of finite type, introduced by Hochman, which is not even topologically mixing, but for which every positive entropy factor is intrinsically ergodic.